A researcher studied the relationship between the number of times a certain species of cricket will chirp in one minute and the temperature outside. Her data is expressed in the scatter plot and line of best fit below. Based on the line of best fit, what temperature would it most likely be outside if this same species of cricket were measured to chirp 120 times in one minute?

A Researcher Studied The Relationship Between The Number Of Times A Certain Species Of Cricket Will Chirp

Answers

Answer 1

The expected change in temperature in degree Fahrenheit for each additional cricket chirp in one minute.

Given the relationship between the number of times a certain species of cricket will chirp in one minute and the temperature outside.

Here, we see that the best fit is a linear regression.

On the y- axis temperature in degree Fahrenheit is labeled and on the x axis chirps per minute is labelled.

Since, the slope = Rate of change of y/ Rate of change of x

So, the slope of line represents the expected change in temperature in degree Fahrenheit for each additional cricket chirp in one minute.

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Related Questions

at the city museum, child admission is $6.20 and adult admission is $9.60. on Thursday, 145 tickets were sold for a total sales of $1109.80 how many child tickets were sold that day?​

Answers

Answer:

Let's assume that the number of child tickets sold is "c" and the number of adult tickets sold is "a".

We can set up a system of two equations to represent the given information:

c + a = 145 (equation 1, the total number of tickets sold is 145)

6.2c + 9.6a = 1109.8 (equation 2, the total sales is $1109.80)

We can use equation 1 to solve for "a" in terms of "c":

a = 145 - c

Substitute this expression for "a" into equation 2 and solve for "c":

6.2c + 9.6(145 - c) = 1109.8

Simplifying the equation:

6.2c + 1392 - 9.6c = 1109.8

-3.4c = -282.2

c = 83

Therefore, 83 child tickets were sold on Thursday. We can find the number of adult tickets sold by substituting the value of "c" into the equation for "a":

a = 145 - c

a = 145 - 83

a = 62

Therefore, 62 adult tickets were sold on Thursday.

Using separation of variables technique, solve the following differential equation with initial condition y, = ey sin, and y(-r)-0. The solution is: ? A. e-y =-sinx +2 B. e-y = -cosx +2 C. e-y = cosx +2 D. ey = cosx +2 E. e-y = cosx

Answers

The correct option is (E) e-y = cos(x).To solve the given differential equation using the separation of variables technique and including the provided terms.

Let's first identify the correct initial condition and rewrite the equation. The correct initial condition should be y(-π) = 0.
The given differential equation is:

dy/dx = ey sin(x)

We can separate the variables as:

dy/ey = sin(x) dx

Integrating both sides, we get:

ln|y| = -cos(x) + C

where C is the constant of integration. Exponentiating both sides, we get:

|y| = e-C e-cos(x)

Now, using the initial condition y(0) = e^y sin(0) = 0, we get:

|y| = e-C

Since we are given that y(-π) = 0, we have:

|y| = e-C = eπ

Therefore, C = -π and the solution for y(x) is:

y(x) = ±e-π e-cos(x)

Simplifying further, we get:

y(x) = eπ e-cos(x)    (for y > 0)

or

y(x) = -eπ e-cos(x)   (for y < 0)

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Final answer:

To solve the differential equation, use separation of variables technique and integrate both sides. Apply the initial condition to find the value of the constant. The correct solution is B) e-y = -cos(x) + 2.

Explanation:

To solve the differential equation using separation of variables technique, we start by rewriting the equation as:

eydy = sin(x)dx

Next, we integrate both sides of the equation. The integral of eydy is simply ey, and the integral of sin(x)dx is -cos(x). So we have:

ey = -cos(x) + C

Finally, applying the initial condition y(-π) = 0, we can solve for C and obtain the solution:

ey = -cos(x) + 2

Therefore, the correct solution is option B: e-y = -cos(x) + 2.

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Find out the missing term of the series.
2 4 11 16 , ,?, , 3 7 21 3

Answers

Given the series 2, 4, 7, 11, 16, the next number in the series is 22.

How did we arrive at this?

Note that series usually have an underlying pattern. In this case, the pattern is that the number added to the previous number to get the new one is increasing arithmetically.

that is

1 +1  = 2
2 + 2 = 4
3 + 4 = 7
4 + 7 = 11
5 + 11 = 16


As you can see , aded 1, then 2, then 3 and so on. Hence it means that we must add 6 to the previous number to get the next number:

That is


6 + 16 = 22

Hence, 22 is the next number in the series.

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By completing the activities in questions 2 and 3 of this Lesson Activity, you have found that different events have different probabilities. For the charitable casino night you are planning, would it be better to assign more points to the events with high probabilities of payout? Why or why not?

Answers

Answer:

Is there any attachment i can see? it would help alot with your question..

Step-by-step explanation:

Final answer:

In conducting a charitable casino night, it may not be prudent to assign more points to high probability events, to ensure a varied and engaging experience for participants. Allocating higher points to high-probability events may result in a less interesting event as participants may only focus on such games, thereby limiting the event’s excitement and diversity.

Explanation:

In a charitable casino night, the aim is usually to encourage guests to participate and have fun, rather than to accrue massive points or wins. If you do not balance the point allocation, you might disempower some games and foster focus on others, leading to possible monotony. Moreover, high probability games tend to have lower payouts in actual casino practice to maintain house advantage. Thus, diversifying point allocations can ensure a mix of high and low probability events, creating a more exciting experience for your guests.

Why Not Higher Points For High Probability Events?

High probability events often have lower payouts. This is because in a real casino, this is the method used to maintain the house advantage. The more likely an event is to occur, the less it pays out when it does occur. This keeps a balance between the payout and probability, ensuring the casino doesn't lose money.

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This implies that H=[7t 0 -5] show that H is a subspace of R³Any vector in H can be written in the form tv = [7t 0 -5] where v =Let H be the set of all vectors of the form Why does this show that His a subspace of R3? A. It shows that H contains the zero vector, which is all that is required for a subset to be a vector space. B. It shows that H is closed under scalar multiplication, which is all that is required for a subset to be a vector space. C. For any set of vectors in R3, the span of those vectors is a subspace of R. D. The vector v spans both H and R3, making H a subspace of R3. E. The span of any subset of R3 is equal to R3, which makes it a vector space. F. The set H is the span of only one vector. If H was the span of two vectors, then it would not be a subspace of R3

Answers

H is closed under scalar multiplication and vector addition, and hence it is a subspace of R³.

The correct answer is B.

To show that H is a subspace of R³, we need to show that it satisfies two conditions: (1) it contains the zero vector, and (2) it is closed under scalar multiplication and vector addition.

Condition (1) is satisfied since we can set t=0 in the expression tv=[7t 0 -5] to get the zero vector [0 0 0],

which is in H.

For condition (2), let u=[7t₁ 0 -5] and v=[7t₂ 0 -5] be two vectors in H, and let c be a scalar.

Then,

cu = c[7t₁ 0 -5] = [7ct₁ 0 -5c]

which is also in H since it has the same form as the vectors in H.

Also,

u + v = [7t₁ 0 -5] + [7t₂ 0 -5] = [7(t₁+t₂) 0 -10]

which is also in H since it has the same form as the vectors in H.

Therefore, H is closed under scalar multiplication and vector addition, and hence it is a subspace of R³.

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H is closed under scalar multiplication and vector addition, and hence it is a subspace of R³.

The correct answer is B.

To show that H is a subspace of R³, we need to show that it satisfies two conditions: (1) it contains the zero vector, and (2) it is closed under scalar multiplication and vector addition.

Condition (1) is satisfied since we can set t=0 in the expression tv=[7t 0 -5] to get the zero vector [0 0 0],

which is in H.

For condition (2), let u=[7t₁ 0 -5] and v=[7t₂ 0 -5] be two vectors in H, and let c be a scalar.

Then,

cu = c[7t₁ 0 -5] = [7ct₁ 0 -5c]

which is also in H since it has the same form as the vectors in H.

Also,

u + v = [7t₁ 0 -5] + [7t₂ 0 -5] = [7(t₁+t₂) 0 -10]

which is also in H since it has the same form as the vectors in H.

Therefore, H is closed under scalar multiplication and vector addition, and hence it is a subspace of R³.

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if logb2=x and logb3=y, evaluate the following in terms of x and y: (a) logb6= 12 (b) logb1296= (c) logb281= (d) logb9logb2=

Answers

The answer of the given question based on the logarithm is , (a) x + y = 12 , (b) 4x + 4y , (c) it can't be simplified it doesn't have any factors in common with 2 or 3. , (d)  2x .

What is Logarithm?

A logarithm is a mathematical function that determines how many times a certain number (called the base) must be multiplied by itself to obtain another number. In other words, it is a measure of the power to which a base must be raised to produce a given number.

(a) Using the fact that 6 = 2 * 3, we can rewrite logb6 as logb(2 * 3) = logb2 + logb3. Therefore, using the given values of x and y, we have:

logb6 = logb2 + logb3 = x + y

Since we are given that logb6 = 12, we can solve for x + y:

x + y = 12

(b) Using the fact that 1296 = 6⁴, we can rewrite logb1296 as logb(6⁴) = 4logb6. Therefore, using the value we found for logb6 in part (a), we have:

logb1296 = 4logb6 = 4(x + y) = 4x + 4y

(c) We can't simplify logb281 any further since it doesn't have any factors in common with 2 or 3. Therefore, we can't express it solely in terms of x and y.

(d) Using the fact that logb9 = 2 and logb2 = x, we have:

logb9logb2 = 2logb2 = 2x

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if we are testing H0:σ1^2=σ2^2 against σ1^2≠σ2^2 and we develop a 1-α percent Cl σ1^2/σ2^2 . what number would be in the Cl if we failed to reject H0?

Answers

The confidence interval would include 1, and the number 1 would be in the confidence interval if we failed to reject H0.

If we failed to reject the null hypothesis H0: σ1² = σ2², we would conclude that there is not enough evidence to suggest that the variances of the two populations are significantly different.

In this case, the confidence interval for the ratio of the variances would contain 1, since a ratio of 1 would correspond to equal variances.

The confidence interval for the ratio of the variances can be calculated using the F-distribution, and can be expressed as:

[ F(α/2,n1-1,n2-1) , F(1-α/2,n1-1,n2-1) ]

where F(α/2,n1-1,n2-1) and F(1-α/2,n1-1,n2-1) are the values from the F-distribution corresponding to the lower and upper limits of the confidence interval, respectively.

If we failed to reject H0, then the calculated test statistic F would not be greater than the critical value F(1-α/2,n1-1,n2-1) or less than the critical value F(α/2,n1-1,n2-1).

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Slope for (-5,1) (5,0)

Answers

Slope is -1/10.

Slope is rise/run or y value over x value.


You would do 1-0/-5-5 and this would get your slope

There are 100 balls in a hat. 23 of them are RED, and 77 are BLACK. 3 balls are drawn at random with replacement.
The following is the discrete probability distribution where R is the number of red balls drawn from the hat described above.
R P(R)
0 0.4565
1 0.4091
2 0.1222
3 0.0122
What is the standard deviation for this probability distribution? (Be sure to use many (floating) decimals in your calculations, but round your answer to 3 decimal places.)

Answers

The standard deviation for this probability distribution is approximately 0.796.

We can use the formula for the standard deviation of a discrete probability distribution:

σ = √[∑(x - μ)² P(x)]

where x is the number of red balls drawn, P(x) is the probability of drawing x red balls, and μ is the expected value of x.

The expected value of x is:

μ = ∑ x P(x) = 0(0.4565) + 1(0.4091) + 2(0.1222) + 3(0.0122) = 0.9797

So, we have:

σ = √[∑(x - μ)² P(x)]

= √[(0 - 0.9797)²(0.4565) + (1 - 0.9797)²(0.4091) + (2 - 0.9797)²(0.1222) + (3 - 0.9797)²(0.0122)]

≈ 0.796

Rounding to 3 decimal places, we get:

σ ≈ 0.796

Therefore, the standard deviation for this probability distribution is approximately 0.796.

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12. determine whether the two statements are equivalent. p ∼ q , ∼ (∼ p q)

Answers

The two statements are not equivalent. To determine whether the two statements are equivalent, we need to examine their logical structures. The statements given are:

1. p ∼ q
2. ∼ (∼ p ∧ q)

The first statement, p ∼ q, represents the exclusive disjunction (XOR) of p and q, which means it is true if either p or q is true, but not both.

The second statement, ∼ (∼ p ∧ q), involves a double negation of p and a conjunction with q. To simplify, we can apply De Morgan's law:

∼ (∼ p ∧ q) = p ∨ ∼ q

This represents the disjunction (OR) of p and the negation of q, which means it is true if p is true or if q is false.

Upon comparing the simplified forms of these two statements, we can see that they are not equivalent, as their logical structures differ:

1. p ∼ q (XOR)
2. p ∨ ∼ q (OR with negation)

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a two-dimensional velocity field is given by =(2 −2)−( 2) at (,) =(1,2) compute acceleration in the -direction and acceleration in the - direction. Determine the equation of the streamline that passes through the origin.

Answers

Acceleration in the x-direction is 8 and acceleration in the y-direction is -4. The equation of the streamline passing through the origin is y = (1/2)x², which is obtained by solving a separable differential equation.

To compute acceleration in the x-direction, we need to take the partial derivative of the x-component of the velocity field with respect to time. Since there is no explicit dependence on time, we only need to compute the partial derivative of the x-component with respect to x and the partial derivative of the y-component with respect to y, and then multiply them by the appropriate factors:

a_x = (∂u/∂x) * u + (∂u/∂y) * v
   = (2) * (2) + (-2) * (-2)
   = 8

Similarly, to compute acceleration in the y-direction, we need to take the partial derivative of the y-component of the velocity field with respect to time, and we get:

a_y = (∂v/∂x) * u + (∂v/∂y) * v
   = (-2) * (2) + (-2) * (-2)
   = -4

Therefore, the acceleration in the x-direction is 8 and the acceleration in the y-direction is -4.

To determine the equation of the streamline that passes through the origin, we need to solve the differential equation:

dx/dt = u = 2 - 2y
dy/dt = v = -2x

We can eliminate t by using the chain rule to get:

dy/dx = v/u = -x/(1-y)

This is a separable differential equation that we can solve by integrating:

∫(1-y)dy = -∫x dx
y - (1/2)y² = - (1/2)x² + C
where C is a constant of integration.

Since the streamline passes through the origin, we have y = 0 and x = 0 when we substitute into the equation above, and we get:

C = 0

Therefore, the equation of the streamline that passes through the origin is:

y = (1/2)x²

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a plumber cuts three sections of pipe from a 12’ length of abs pipe, the lengths of the sections are 33 3/8", 56 5/8" and 39 7/8". what is left over from the full length, if the saw cut is 1/8" wide?

Answers

There are 14 7/8" left over from the full 13-foot length of ABS pipe after cutting the three sections and accounting for the saw cuts.

To find out what is left over from the full length of the ABS pipe, we need to add up the lengths of the three sections that were cut:

33 3/8" + 56 5/8" + 39 7/8" = 129 6/8" or 129 3/4"

Next, we need to subtract the total length of the cut sections from the original length of the pipe, but we need to take into account the width of the saw cut, which is 1/8". So, we need to add 1/8" to the total length of the cut sections before subtracting it from the original length:

12 feet = 144 inches
144 inches - (129 3/4" + 1/8") = 14 7/8"

Therefore, there is 14 7/8" of ABS pipe left over from the full length after the three sections were cut, accounting for the width of the saw cut.
To determine the leftover length of the ABS pipe, we first need to calculate the total length of the cut sections, including the width of the saw cuts.

1. Convert the 12' length to inches: 12' × 12" = 144"
2. Add the lengths of the three cut sections: 33 3/8" + 56 5/8" + 39 7/8" = 129 7/8"
3. Account for the saw cuts: Since there are 3 cuts, there are 2 saw cuts between them, so 2 × 1/8" = 1/4"
4. Calculate the total length used: 129 7/8" + 1/4" = 130 1/8"
5. Subtract the total length used from the full length: 144" - 130 1/8" = 13 7/8"

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A garden is in the shape of a rectangle 26 feet long and 25 feet wide. If fencing costs $5 a foot, what will it cost to place fencing around the garden? A. $255 B. $510 C. $1020 D. $3250

Answers

Answer:

$5 × 2 × (26 + 25) = $5 × 2 × 51 = $5 × 102

= $510

B is the correct answer.

write the inequality that shows the values of X for which the expression is defined.
(can someone help on all of them?)

Answers

1. The values of x for which the expression is defined;

1. x ≥ 0   2. x ≥ 3    3. x ≥ 0    4. x ≥ 3 and x ≠ 0.

2. The acceptable value of x for the simplified expression;

5.  6x√x,             6.  √(x² - 64),

7. 2x,                     8.  √(25 / (x + 2)),

9. √(x / 9)              10. √(10) or 3.2,  

How did we find the value of x as defined by the expressions?

1. for the inequality √(2x) × √(x + 1) must be non-negative:

2x ≥ 0 => x ≥ 0

x + 1 ≥ 0 => x ≥ -1

if we are to combine terms we find that  x ≥ 0 satisfy both terms.

2. To simplify the expression as much as possible for the value of x

√20x³ ÷ √5x

= (√20x³) / (√5x)

= √(20x³ / 5x)

= √(4x²)

= 2x

The answers are from the questions below as seen in the picture;

1. Write the inequality that shows the values of x for which the expression is defined. 1. √2x  ×  √x + 1      2. √x - 2  ×  √x - 3     3. √5x²   ÷  √2x   4. √x - 3    ÷ √x²

2. Simplify the expression as much as possible for the acceptable value of x.

5. √18x  ×  √2x²      6. √x + 8   ×  √x - 8     7. √20x³    ÷  √5x    8. √75(x + 2)   ÷   √3(x + 2)²    9. √10/x    ×   √x²/90     10. √x³/5   ×   √50/x³

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(a) Prove that R(T+U) SR(T) +R(U).
(b) Prove that if W is finite-dimensional, then rank(T+U) < rank(T)+ rank(U).
(c) Deduce from (b) that rank(A + B) < rank(A) + rank(B) for any m X n matrices A and B.

Answers

It is all proved that,

(a) R(T+U) SR(T) +R(U).

(b) If W is finite-dimensional, then rank(T+U) < rank(T)+ rank(U).

(c) rank(A + B) < rank(A) + rank(B) for any m X n matrices A and B.

(a) To prove that R(T+U)⊆R(T)+R(U), let y be any vector in R(T+U). Then, there exists a vector x such that (T+U)x = y. We can rewrite this as Tx + Ux = y. Since Tx is in R(T) and Ux is in R(U), we have y = Tx + Ux ∈ R(T) + R(U). Therefore, we have shown that R(T+U)⊆R(T)+R(U).

To prove that R(T)+R(U)⊆R(T+U), let y be any vector in R(T)+R(U). Then, there exist vectors x and z such that Tx = y and Uz = y. We can rewrite this as (T+U)x - Ux + Uz = y. Since (T+U)x is in R(T+U) and Ux-Uz is in R(U), we have y = (T+U)x + (Ux-Uz) ∈ R(T+U). Therefore, we have shown that R(T)+R(U)⊆R(T+U).

Hence, we have proved that R(T+U) = R(T) + R(U).

(b) Let A be the matrix representation of T with respect to some basis of W, and let B be the matrix representation of U with respect to the same basis. Then, the matrix representation of T+U is A+B. By the rank-nullity theorem, we have rank(T) = dim(R(T)) = dim(W) - nullity(T), where nullity(T) is the dimension of the null space of T. Similarly, we have rank(U) = dim(W) - nullity(U).

Now, since W is finite-dimensional, the nullity of T+U is at least the nullity of T and the nullity of U, i.e., nullity(T+U) ≥ nullity(T) and nullity(T+U) ≥ nullity(U). Therefore, we have:

rank(T+U) = dim(W) - nullity(T+U)

≤ dim(W) - min(nullity(T), nullity(U))

= rank(T) + rank(U) - dim(W)

< rank(T) + rank(U)

Therefore, we have shown that rank(T+U) < rank(T) + rank(U) if W is finite-dimensional.

(c) Let A and B be m x n matrices. We can view A and B as linear transformations from [tex]R^n[/tex] to [tex]R^m[/tex]. Let T and U be the linear transformations represented by A and B, respectively. Then, we have:

rank(A+B) = rank(T+U) < rank(T) + rank(U)

= dim(R(T)) + dim(R(U))

= rank(A) + rank(B)

Therefore, we have shown that rank(A+B) < rank(A) + rank(B) for any m x n matrices A and B.

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Does the list of numbers include only integers? Choose yes or no for each list.
A. 6; 15; 5,488;536
B. -5;32 1/5; 819; -47
C. -58; -963; -4; -17
D.82; 385; 1,222; 9
E. 302; 19; -6; 4.81

Answers

A. Yes
B. No
C. Yes
D. Yes
E. No

1. Consider a beam of length L=5 feet with a fulcrum x feet from one end as shown in the figure. In order to move a 550-pound object, a person weighing 214 pounds wants to balance it on the beam. Find x (the distance between the person and the fulcrum) such that the system is equilibrium. Round your answer to two decimal places.2. Find the volume of the solid generated by rotating the circle x^2+(y-10)^2=64 about the x-axis.

Answers

1. The person should be positioned 3.59 feet from the fulcrum to balance the system.

2. The volume of the solid generated by rotating the circle is V ≈ 33510.32 cubic units.

How to find distance between the person and the fulcrum?

To find the distance between the person and the fulcrum, we need to use the principle of moments, which states that the sum of the moments acting on a body in equilibrium is zero. In this case, the moments are the weights of the object and the person acting on opposite sides of the fulcrum.

Let x be the distance between the person and the fulcrum, and let L-x be the distance between the object and the fulcrum. Then we can write:

214(x) = 550(L-x)

Simplifying this equation, we get:

214x = 550L - 550x764x = 550Lx = (550/764)L

Plugging in L=5 feet, we get:

x = (550/764)*5 = 3.59 feet

Therefore, the person should be positioned 3.59 feet from the fulcrum to balance the system.

How to find volume of the solid generated by rotating the circle?

The equation x² + (y-10)² = 64 represents a circle with center (0,10) and radius 8.

To find the volume of the solid generated by rotating this circle about the x-axis, we can use the formula for the volume of a solid of revolution:

V = π∫[a,b] y² dx

where y is the distance from the x-axis to the circle at a given value of x, and [a,b] is the interval of x-values that the circle passes through.

Since the circle is centered at (0,10), we have y = 10 ± [tex]\sqrt^(64-x^2)[/tex]. However, we only want the upper half of the circle (i.e., the part above the x-axis), so we take y = 10 + [tex]\sqrt^(64-x^2)[/tex]. The interval of x-values that the circle passes through is [-8,8].

Thus, the volume of the solid of revolution is:

V = π∫[-8,8] (10 + [tex]\sqrt^(64-x^2))^2[/tex] dx= π∫[-8,8] (100 + 20[tex]\sqrt^(64-x^2)[/tex]+ (64-x²)) dx= π(∫[-8,8] 100 dx + 20∫[-8,8] [tex]\sqrt^(64-x^2)[/tex]) dx + ∫[-8,8] (64-x²) dx)

Using the substitution x = 8sin(t), dx = 8cos(t) dt, we can evaluate the second integral as:

∫[-8,8] [tex]\sqrt^(64-x^2)[/tex] dx = 8∫[-π/2,π/2] cos²(t) dt = 8∫[-π/2,π/2] (1+cos(2t))/2 dt = 8π

Using the substitution x = 8u, dx = 8 du, we can evaluate the third integral as:

∫[-8,8] (64-x²) dx = 2∫[0,1] (64-64u²) du = 2(64)

Therefore, the volume of the solid of revolution is:

V = π(100(16) + 20(8π) + 2(64))

= 3200π/3

Rounding to two decimal places, we get:

V ≈ 33510.32 cubic units.

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Determine the value of c that makesthe function f(x,y) = ce^(-2x-3y) a joint probability densityfunction over the range 0 < x and 0 < y < x
Determine the following :
a) P(X < 1,Y < 2)
b) P(1 < X < 2)
c) P(Y > 3)
d) P(X < 2, Y < 2)
e) E(X)
f) E(Y)
g) MARGINAL PROBABILITY DISTRIBUTION OF X
h) Conditional probability distribution of Y given that X=1
i) E(Y given X = 1)
j) Conditional probability distribution of X given Y = 2

Answers

So  the values of c are:

a) P(X < 1,Y < 2) = 0.0244

b) P(1 < X < 2) = 0.102c

c) P(Y > 3) = 0.0014c

d)  P(X < 2, Y < 2) = 0.073c

e) E(X) = c/12

f) E(Y) = c/18

g) f(x) =∫[0,x] [tex]ce^{(-2x-3y)}[/tex]

= c/3 (1 -[tex]e^{(-3x)}[/tex])

h) f(X=1) = c

i) E(Y|X=1) = 1/2

j)[tex]f(x|y=2) = c/2 * e^{(-4-2y)} * (e^{(4)}-1) / [c/4 * (e^5))[/tex]

How to find P(X < 1,Y < 2)?

a) To find P(X < 1, Y < 2), we need to integrate the joint probability density function over the region where 0 < x < 1 and 0 < y < 2.

∫∫f(x,y) dA = ∫[0,1]∫[0,y] [tex]ce^{(-2x-3y)}[/tex]dxdy

= ∫[0,2]∫[x/2,1] [tex]ce^{(-2x-3y)}[/tex] dydx (since 0 < x < 1 and 0 < y < x)

= [tex]c/6 [1 - e^{(-4)} - 2e^{(-3)} + e^{(-7)}][/tex] ≈ 0.0244

How to find P(1 < X < 2)?

b) To find P(1 < X < 2), we need to integrate the joint probability density function over the region where 1 < x < 2 and 0 < y < x.

∫∫f(x,y) dA = ∫[1,2]∫[0,x] [tex]ce^{(-2x-3y)}[/tex] dydx

= [tex]c/3 [e^{(-2)} - e^{(-5)}][/tex] ≈ 0.102c

How to find P(Y > 3)?

c) To find P(Y > 3), we need to integrate the joint probability density function over the region where 0 < x < ∞ and 3 < y < x.

∫∫f(x,y) dA = ∫[3,∞]∫[y,x] [tex]ce^{(-2x-3y)}[/tex] dxdy

= c/6 [tex]e^{(-9)}[/tex] ≈ 0.0014c

How to find P(X < 2, Y < 2)?

d) To find P(X < 2, Y < 2), we need to integrate the joint probability density function over the region where 0 < x < 2 and 0 < y < 2.

∫∫f(x,y) dA = ∫[0,2]∫[0,y] [tex]ce^{(-2x-3y)}[/tex] dxdy

= [tex]c/6 [1 - e^{(-4)} - 3e^{(-6)}][/tex] ≈ 0.073c

How to find E(X)?

e) To find E(X), we need to integrate the product of X and the joint probability density function over the range of X and Y.

E(X) = ∫∫xf(x,y) dA = ∫[0,∞]∫[0,x] cx [tex]e^{(-2x-3y)}[/tex]dydx

= c/12

How to find E(Y)?

f) To find E(Y), we need to integrate the product of Y and the joint probability density function over the range of X and Y.

E(Y) = ∫∫yf(x,y) dA = ∫[0,∞]∫[0,x] cy [tex]e^{(-2x-3y)}[/tex] dydx

= c/18

How to find Marginal propability?

g) To find the marginal probability distribution of X, we need to integrate the joint probability density function over all possible values of Y.

f(x) = ∫f(x,y) dy = ∫[0,x]  dy[tex]ce^{(-2x-3y)}[/tex]

= c/3 (1 -[tex]e^{(-3x)}[/tex])

How to find Conditional probability distribution of Y given that X=1?

h) To find the conditional probability distribution of Y given that X = 1, we need to use the conditional probability formula:

f(Y|X=1) = f(X,Y) / f(X=1)

where f(X=1) is the marginal probability distribution of X evaluated at X=1.

f(X=1) = c

How to find E(Y given X = 1)?

i) To find E(Y|X=1), we need to first find the conditional density function f(y|x=1). Using Bayes' theorem, we have:

f(y|x=1) = f(x=1,y) / f(x=1)

To find f(x=1,y), we can integrate f(x,y) over the range of y such that 0<y<1:

f(x=1,y) = ∫[y=0 to y=1] f(x=1,y)dy

= ∫[y=0 to y=1] [tex]ce^{(-2(1)-3y)}[/tex]dy

= [tex]ce^{(-5)}/3 * (1-e^{(-3)})[/tex]

To find f(x=1), we can integrate f(x,y) over the range of y such that 0<y<1 and x such that x=y to x=1:

f(x=1) = ∫[y=0 to y=1] ∫[x=y to x=1] [tex]ce^{(-2x-3y)}[/tex]dxdy

= ∫[y=0 to y=1] [tex]ce^{(-5y)/2}[/tex] dy

= [tex]c*(1-e^{(-5)})/10[/tex]

Thus, we have:

[tex]f(y|x=1) = ce^{(-5)/3} * (1-e^{(-3)}) / [c(1-e^{(-5)})/10][/tex]

[tex]= 2/3 * e^{(2y/3)} * (1-e^{(-3)}) / (1-e^{(-5)})[/tex]

Using this conditional density function, we can find E(Y|X=1) as follows:

E(Y|X=1) = ∫[y=0 to y=1] y*f(y|x=1)dy

= ∫[y=0 to y=1] y * 2/3 * [tex]e^{(2y/3)} * (1-e^{(-3)}) / (1-e^[(-5)}) dy[/tex]

= 1/2

Therefore, E(Y|X=1) = 1/2.

How to find conditional probability distribution of X given Y = 2?

j) To find the conditional probability distribution of X given Y=2, we need to find f(x|y=2). Using Bayes' theorem, we have:

f(x|y=2) = f(x,y=2) / f(y=2)

To find f(x,y=2), we can integrate f(x,y) over the range of x such that y<x<2:

f(x,y=2) = ∫[x=y to x=2] f(x,y=2)dx

= ∫[x=y to x=2] [tex]c*e^{(-2x-6)}[/tex]dx

= c/2 * [tex]e^{(-4-2y) }* (e^{(4)}-1)[/tex]

To find f(y=2), we can integrate f(x,y) over the range of x such that y<x<2 and y such that 0<y<2:

f(y=2) = ∫[y=0 to y=2] ∫[x=y to x=2] [tex]c*e^{(-2x-3y)}[/tex]dxdy

= ∫[y=0 to y=2] c/2 *[tex]e^{(-3y)} * (e^{(4)}-e^{(-4)}) dy[/tex]

[tex]= c/4 * (e^5-e^{(-5)})[/tex]

Thus, we have:

[tex]f(x|y=2) = c/2 * e^{(-4-2y)} * (e^{(4)}-1) / [c/4 * (e^5))[/tex]

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Determine the value of c that makes thefunction f(x, y) = ce^−2x−3y a jointprobability density function over the range 0

Answers

the value of c that makes the function f(x, y) = ce^−2x−3y a joint probability density function over the given range is:
[tex]c = -6 / (e^−5-1)[/tex]

To determine the value of c that makes the function f(x, y) = [tex]ce^−2x−3y[/tex] a joint probability density function over the range 0 ≤ x ≤ 1 and 0 ≤ y ≤ 1, we need to make sure that the function integrates to 1 over this range. This is because the total probability over the entire range should equal 1.

Step 1: Set up the double integral
To ensure that the function integrates to 1, we can set up a double integral over the given range:

∫∫ f(x, y) dx dy = 1

Step 2: Plug in the function and limits
Now we can plug in the function and the limits for x and y:

∫₀¹ ∫₀¹ ce^−2x−3y dx dy = 1

Step 3: Integrate with respect to x
Integrate the function with respect to x:

∫₀¹ [(-c/2)e^−2x−3y]₀¹ dy = 1

Evaluate the integral at the limits:

∫₀¹ [-c/2(e^−2−3y - e^−3y)] dy = 1

Step 4: Integrate with respect to y
Now integrate with respect to y:

[-c/6(e^−5 - 1)]₀¹ = 1

Evaluate the integral at the limits:

- c/6(e^−5 - 1) = 1

Step 5: Solve for c
Finally, solve for c:

c = -6 / (e^−5 - 1)

So, the value of c that makes the function f(x, y) = ce^−2x−3y a joint probability density function over the given range is:

c = -6 / (e^−5 - 1)

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the standard form of a parabola is given by y = 9 (x - 7)^2+5. find the coefficient b of its polynomial form y = ax^2 +bx + c. write the result using 2 exact decimals.

Answers

The value of coefficient b of the polynomial y = ax^2 +bx + c is -126.

To find the coefficient b of the polynomial form y = ax^2 + bx + c, we need to first expand the given standard form of the parabola y = 9(x - 7)^2 + 5.

Step 1: Expand the square term
(y - 5) = 9(x - 7)^2

Step 2: Expand the equation
y - 5 = 9(x^2 - 14x + 49)

Step 3: Distribute the 9 to each term inside the parenthesis
y - 5 = 9x^2 - 126x + 441

Step 4: Add 5 to both sides to get the polynomial form
y = 9x^2 - 126x + 446

Now compare y = 9x^2 - 126x + 446 with y = ax^2 + bx + c, so that value of the constant a, b, c is a = 9, b = -126, and c = 446. So, the coefficient b of the polynomial form is -126.

Explanation: - Given a equation of parabola y = 9 (x - 7)^2+5, first we expand the expression and make it as a quadratic equation and compare with equation ax^2 +bx + c.

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A certain radioactive material is known to decay at a rate proportional to the amount present. A block of this material originally having a mass of 100 grams is observed after 20 years to have a mass of only 80 grams. Find the half-life of this radioactive material. Recall that the half-life is the length of time required for the material to be reduced by a half.) O 54.343 years O 56.442 years O 59.030 years O 61.045 years O 62.126 years

Answers

The half-life of this radioactive material is , 62.126 years

The half-life of the radioactive material, we can use the formula:

N(t) = N⁰ [tex]e^{-kt}[/tex]

where N(t) is the amount of material remaining after time t, N0 is the initial amount of material, k is the decay constant, and e is the mathematical constant approximately equal to 2.71828.

We know that the initial mass of the material was 100 grams and the mass after 20 years was 80 grams.

This means that the amount of material remaining after 20 years is:

N(20) = 80/100 = 0.8

We also know that the time required for the material to be reduced by half is the half-life, so we can set N(t) = 0.5N0 and solve for t:

0.5N0 = N⁰ [tex]e^{-kt}[/tex]

0.5 = [tex]e^{-kt}[/tex]

ln(0.5) = -kt

t = ln(0.5)/(-k)

To find k, we can use the fact that the material decay rate is proportional to the amount present:

k = ln(2)/t_half

where t_half is the half-life.

Substituting this into the equation for t, we get:

t = ln(0.5)/(-ln(2)/t_half)

Simplifying this expression, we get:

t = t_half * ln(2)

Using the given answer choices, we can try plugging in values for t_half and see which one gives us a value close to 20 years:

If t_half = 54.343 years, then t = 37.38 years, which is too low.

If t_half = 56.442 years, then t = 38.93 years, which is also too low.

If t_half = 59.030 years, then t = 40.68 years, which is too high.

If t_half = 61.045 years, then t = 42.33 years, which is too high.

If t_half = 62.126 years, then t = 43.13 years, which is close to 20 years.

Therefore, the half-life of this radioactive material is, 62.126 years.

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if the mu/p ratio for pizza is less than the mu/p ratio for soda, this means that ___A. an individual is receiving more utility per dollar from soda than pizzaB. the price of pizza is lower than the price of sodaC. the price of pizza is lower than the price of cokeD. the MU of pizza is lower than the MU of soda

Answers

If the mu/p ratio for pizza is less than the mu/p ratio for soda, this means that an individual is receiving more utility per dollar from soda than pizza (Option A).

In other words, the marginal utility of spending one more dollar on soda is greater than spending one more dollar on pizza. This doesn't necessarily mean that the price of pizza is lower than the price of soda (Option B) or that the price of pizza is lower than the price of coke (Option C), as the prices of the two goods could be equal or have different relative prices. It also doesn't mean that the MU of pizza is lower than the MU of soda (Option D), as the MU of each good could be different regardless of their price ratios.

The final answer is: Option A

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Celina is making squares with toothpicks. She notices that in making one square, she uses 4 toothpicks.
She continues the pattern and notices that it takes 7 toothpicks to build two squares side by side. To build three squares in a line, she will need 10 toothpicks. If she continues this pattern, how many toothpicks will she need to make 90 squares in a straight line?
How many squares can she build in this pattern if the box she has contains 1,000 toothpicks?
Explain how you figured out one of these answers.

Answers

Answer:

270

Step-by-step explanation:

Suppose it is known that the response time of subjects to a certain stimulus follows a Gamma distribution with a mean of 12 seconds and a standard deviation of 6 seconds. What is the probability that the response time of a subject is more than 9 seconds?

Answers

I may or may not be lying >:^P

The probability that the response time of a subject is more than 9 seconds can be expressed as:

P(X > 9) = 1 - P(X ≤ 9)

We can find P(X ≤ 9) by standardizing X and using the cumulative distribution function (CDF) of the standard Gamma distribution. Specifically, we can compute:

Z = (X - μ) / σ = (9 - 12) / 6 = -0.5

Using a standard Gamma distribution table or software, we can find the CDF for Z = -0.5 to be approximately 0.3085.

Therefore:

P(X > 9) = 1 - P(X ≤ 9) ≈ 1 - 0.3085 ≈ 0.6915

So the probability that the response time of a subject is more than 9 seconds is approximately 0.6915 or 69.15%.

*IG:whis.sama_ent*

I may or may not be lying >:^P

The probability that the response time of a subject is more than 9 seconds can be expressed as:

P(X > 9) = 1 - P(X ≤ 9)

We can find P(X ≤ 9) by standardizing X and using the cumulative distribution function (CDF) of the standard Gamma distribution. Specifically, we can compute:

Z = (X - μ) / σ = (9 - 12) / 6 = -0.5

Using a standard Gamma distribution table or software, we can find the CDF for Z = -0.5 to be approximately 0.3085.

Therefore:

P(X > 9) = 1 - P(X ≤ 9) ≈ 1 - 0.3085 ≈ 0.6915

So the probability that the response time of a subject is more than 9 seconds is approximately 0.6915 or 69.15%.

*IG:whis.sama_ent*

calculate the sum of the series [infinity] an n = 1 whose partial sums are given. sn = 4 − 9(0.8)n

Answers

The sum of the given series[inifinity] is 4 when partial sums are given.

The sum of the series [infinity] an n = 1, whose partial sums are given by sn = 4 − 9(0.8)n, can be calculated as follows:

As n approaches infinity, the term 9(0.8)n approaches zero, since 0.8 is less than 1 and raised to a large power will become negligible.

Thus, the sum of the series is simply the limit of the partial sums as n approaches infinity. Taking the limit of sn as n approaches infinity, we get:

limn→∞ sn = limn→∞ (4 − 9(0.8)n) = 4

The series is given by an = sn − sn−1, where sn is the nth partial sum. In other words, each term of the series is the difference between successive partial sums. To find the sum of the series, we need to take the limit of the nth partial sum as n approaches infinity.

In this case, we are given the nth partial sum explicitly, so we can take the limit directly. As n becomes very large, the term 9(0.8)n becomes very small compared to 4 and can be ignored. This means that the sum of the series is simply the constant term 4.

This technique of finding the sum of a series by taking the limit of its partial sums is a common approach in calculus and real analysis and is often used to evaluate infinite series that do not have a closed-form expression.

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Given the function defined in the table below, find the average rate of change, in
simplest form, of the function over the interval 2 ≤ x ≤ 6.
x
0
2
4
6
8
10
f(x)
10
18
26
34
42
50

Answers

The average rate of change of the function over the interval 2 ≤ x ≤ 6 is 4.

Calculating the average rate of change

The average rate of change of a function over an interval is given by the formula:

average rate of change = (change in y) / (change in x)

where (change in y) = f(b) - f(a) and (change in x) = b - a.

Using the values given in the problem, we have:

(change in y) = f(6) - f(2) = 34 - 18 = 16

(change in x) = 6 - 2 = 4

So the average rate of change over the interval 2 ≤ x ≤ 6 is:

average rate of change = (change in y) / (change in x) = 16 / 4 = 4

Therefore, the average rate of change of the function over the interval 2 ≤ x ≤ 6 is 4.

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the estimate a population mean. the sample size needed to proveide a margin of error of 2 or less with a .95 probability when the populatioon standard deviation equals 13 is

Answers

The sample size needed to provide a margin of error of 2 or less with a 0.95 probability when the population standard deviation equals 13 is approximately 163.

To estimate a population mean with a margin of error of 2 or less, a 0.95 probability, and a population standard deviation of 13, we need to calculate the required sample size. Here are the steps to do so:

1. Identify the given values:

the margin of error (E) = 2,

confidence level (CL) = 0.95, and

population standard deviation (σ) = 13.

2. Determine the Z-score corresponding to the confidence level.

For a 0.95 probability, the Z-score (Z) is 1.96, which represents the critical value for a 95% confidence interval.

3. Use the margin of error formula to calculate the sample size (n):
  E = Z * (σ / √n)

4. Rearrange the formula to solve for n:
  n = (Z * σ / E)²

5. Plug in the values:
  n = (1.96 * 13 / 2)²

6. Calculate the result:
  n ≈ 162.3076

7. Round up to the nearest whole number, as you cannot have a fraction of a sample:
  n ≈ 163

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i) (r + 1)(r + 9) = 16 r​

Answers

Answer:

r = 3

Step-by-step explanation:

(r + 1)(r + 9) = 16r ← expand left side using FOIL

r² + 9r + r + 9 = 16r

r² + 10r + 9 = 16r ( subtract 16r from both sides )

r² - 6r + 9 = 0

(r - 3)² = 0 , then

r - 3 = 0 ( add 3 to both sides )

r = 3

Given the following information for two independent samples, calculate the pooled standard deviation, sp.s1 = 10; n1 = 15; s2 = 13; n2 = 25a. 11.20b. 10.99c. 11.50d. 11.98

Answers

The pooled standard deviation is approximately 11.98.

What is standard deviation?

Standard deviation is a statistical measure that describes the amount of variation or dispersion of a set of data points from their mean or average. It indicates how spread out the data is from the average value.

A low standard deviation indicates that the data is clustered closely around the mean, while a high standard deviation indicates that the data is more spread out. It is typically represented by the symbol σ (sigma) for a population or s for a sample.

The formula for the pooled standard deviation is:

[tex]sp = \sqrt{[((n1 - 1) * s1^2 + (n2 - 1) * s2^2) / (n1 + n2 - 2)][/tex]

where s1 and s2 are the sample standard deviations, and n1 and n2 are the sample sizes.

Substituting the given values, we get:

[tex]sp = \sqrt{[((15 - 1) * 10^2 + (25 - 1) * 13^2) / (15 + 25 - 2)][/tex]

[tex]= \sqrt{[(14 * 100 + 24 * 169) / 38][/tex]

[tex]= \sqrt{[5456 / 38][/tex]

[tex]= \sqrt{(143.57)[/tex]

≈ 11.98

Therefore, the pooled standard deviation is approximately 11.98.

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HELP ASAP 100 POINTS!! WILL PICK BRAINLIEST
A rectangular prism and a square pyramid were joined to form a composite figure. What is the surface area of the figure?

Answers

B. 333 in.2

How to solve

The area of the base is 81^2

lateral is 45 x 4 = 180^2  (9x5x4)

180^2 add the 72 pyramid = 252^2 + base of 81^2 = 333^2

The triangle shows us just the height

4 inches

We can see that height is smaller central isosceles height across the center base point.

We also can remember to use the length 9inches but divide by 2 and get each triangle area this way.

4 x 1/2 base = 4x 1/2 4.5 = 4 x 2.25 = 9^2 each right side triangle

9 x 8 = 72^2

we add the areas 72+ 81+lateral 180 = 333 inches^2

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Mi hermana (a. pona b. puso) la mesa mientras yo (a. lea b. le) el peridico.10. Cundo (a. llegaba b. lleg) Marcos?11. El hombre (a. cantaba b. cant) cuando la mujer (a. llegaba b. lleg).12. (a. Eran b. Fueron) las tres de la tarde.13. Mi padre (a. venda b. vendi) su casa por dos mil pesos el mes pasado.14. (a. Haca b. Hizo) fresco en las montaas.15. El nio (a. empezaba b. empez) a llorar.16. Es verdad que vosotros (a. salais b. salisteis) de Madrid anteayer?17. Cada da los chicos (a. miraban b. miraron) la televisin18. Cenicientas (a. quera b. quiso) ir al baile.19. Casi todos los veranos mi abuela nos (a. visitaba b. visit).20. (a. Llegbamos b. Llegamos) a la ciudad anoche.21. De vez en cuando Teodoro (a. sala b. sali) con Mariana.22. Cuntos aos (a. tena b. tuvo) ella?23. Hace una semana que yo (a. iba b. fui) a la casa de mi amigo.24. Don Felipe y su esposa (a. eran b. fueron) espaoles.25. Cmo (a. se llamaba b. se llam) la hija de don Felipe? Need to take 1000 mg of calcium and 600 units of vit D Daily. Available is a bottle of calcium carbonate vit D3 250mg-125 unit tablets determine s for the phase change of 2.80 moles of water from liquid to solid at 0.0 c. (h = -6.01 kj/mol) For the given parametric equations, find the points (x, y) corresponding to the parameter values t = -2, -1, 0, 1, 2. x = In(8t2 + 1), t y = t +9 t = -2 (x, y) = ( 3.5, 7 t = -1 (x, y) = 2.2, - 1 1 8 x t = 0 (x, y) = (0.0 t = 1 (x, y) = 2.2. 1 10 X t = 2 (x, y) = -(3.5, 11 X 41. Explain how the global economic depression of the 1930s contributed to Japan's role in WWII Test Your Understanding 1. Mr Jones would like to calculate the cost of using 32 kl of water per month. Study the water tariff table below and calculate the difference in cost that Mr Jones would have to pay from 2014 to 2015: Prices per kilolitre excluding VAT k < 9 k < 25 kl < 30 k < 32 0 9 25 30 2014 nil R13,51 R17,99 R27,74 2015 LOWA nil R14,79 R19,70 R30,38 C Would you consider conducting a cross-tabulation analysis using MLTSRV and MFPAY?Select one:a. No, it doesnt make any sense trying to establish a relationship between these two variablesb. Yes, they are both nominal variables taking on two values each. So a 2x2 makes sense. the data-to-ink ratio is calculated by dividing the amount of data-ink by the amount of data ink to obtain a percentage Indicate whether the listed components of an immune response interact directly with an antigen, or if presentation of the antigen by an antigen-presenting cell is required. Labels may be used twice. Macrophage B cell Cytotoxic T cell Antibody Helper T cellInteracts Directly with Antigen Interacts with Antigen Bound to Antigen- sawyer corporations 2018 sales were $5 million. its 2013 sales were $2.5 milliona.At what rate have sales been growing? Round your answer to two decimal places. b.Suppose someone made this statement: "Sales doubled in 5 years This represents a growth of 100% in 5 years; so dividing 100% by 5, we find the growth rate to be 20% per year." Is the statement correct? -Select- The statement is correct because 100% divided by 5 equals 20% -The statement is incorrect because there are 6 years of sales growth between 2013 and 2018. -The statement is incorrect because a company's sales cannot double in such a short time span. -The statement is incorrect since the effect of compounding is not considered. The statement is correct since the effect of discounting is considered. You want to buy a car, and a local bank will lend you $30,000. The loan will be fully amortized over 5 years (60 months), and the nominal interest rate will be 7% with interest paid monthly. What will be the monthly loan payment? What will be the loan's EAR? Do not round intermediate calculations. Round your answer for the monthly loan payment to the nearest cent and for EAR to two decimal places. One of the reactions that is often studied in equilibrium experiment is: NH3 + H2O NH4 + OHWhat would happen to the concentration of NH3 if you added some pure water to the reaction? briefly explain Solve the following equations: 3x+5=x+12 When transaction costs are high, we would expect to see:A. More inter-firm alliancesB. Smaller more specialized firmsC. Frequent arms-length market exchangesD. Less merger activity What is the area of the figure? Upload your completed Lesson 8 Simulation here. 8.Organizing Content in Tables A cleaning soluation had a poh of 4.0, what is the hydronium ion concentration? write about someone in your life who embodies this lifelong learner attitude that Rose depicts in his essay. Start your essay by telling me a little bit about this person. Keep in mind that I don't know them (and I don't know you too well either!). Help me understand who they are and what they mean to you. Then, talk about why their learning and efforts inspire you. You might even interview them, if possible, to ask them about their views on learning and growing in life.