Answer:
Thanks for points anyway :)
Calculate the probability of randomly selecting a vehicle with an engine size greater than 3.9 L
We have that to calculate the probability we consider factors that decide what engine is chosen and the odds of choosing an engine size greater than 3.9 L
Probability of choosing an engine sizeQuestion Parameters:
an engine size greater than 3.9 L
Generally, This can be defined as the possibility of an event occurring with respect to other possible outcomes.
Probability looks at calculating the possibility of a given event's occurrence.
Therefore, to determine the possibility of selecting an engine size greater than 3.9 L, we consider factors than decide what engine is chosen and the odds of choosing an engine size greater than 3.9 L
For more information on probability
https://brainly.com/question/795909
Reed bought 25 bags of candy and divided the total number of red candies in the bags by the total pieces
of candy in the bags. What kind of probability did Reed find? (classical or relative frequency).
The type of probability that reed was trying to find is; Classical Probability
What is Classical Probability?Classical probability is defined as the statistical concept that measures the likelihood of something happening. It is also defined as the concept where every statistical experiment contains elements that are equally likely to happen.
In a nutshell, A classical probability is given by the number of desired outcomes divided by the number of total outcomes, considering no prior results of the experiments.
Read more about Classical Probability at; https://brainly.com/question/24761592
add the three fractions
4/7+5/12=1/5
Answer:
499/420 or 1 79/420
Explanation:
4/7 + 5/12 + 1/5
4/7 + 5/12
83/84
83/84 + 1/5
499/420 or 1 79/420
I hope it helps! Have a terrific day!!
Lilac~
36. If you ever had a paying job outside the home, were you ever asked to perform a hazardous job?
(1 point)
O A. Yes
O B. No
O C. Not Sure
O D. Not Applicable
7
91. Exploring Complementary Events: The numbers 1 to 50 are in a hat. If the probability of drawing an even number is 25/50, what is the probability of NOT drawing an even number? Express this probability as a fraction.