matthewdabber7
04.04.2020 •
Mathematics
Xavier and Yolanda both have classes that end at noon and they agree to meet every day after class. They arrive at the coffee shop independently. Xavier's arrival time is X and Yolanda's arrival time is Y, where X and Y are measured in minutes after noon. The individual density functions are given. (Xavier arrives sometime after noon and is more likely to arrive promptly than late. Yolanda always arrives by 12:10 PM and is more likely to arrive late than promptly.) After Yolanda arrives, she'll wait for up to 15 minutes for Xavier, but he won't wait for her. Find the probability that they meet. (Round your answer to three decimal places.) f1(x) = e−x if x ≥ 0 0 if x < 0 f2(y) = 1 50 y if 0 ≤ y ≤ 10 0 otherwise
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Ответ:
The answer is
Step-by-step explanation:
In this case, we have to find the common factor of both terms.
The common factor between the coefficients is 17 because 34=17*2.
Then, the common factor between the variables is "x" because it is in both terms.
Finally the common factor is "17x". With this factor, we have to find the multiplies to get the original terms.
First term:
17x*1=17x
Second term:
17x*(-2y)=-34xy
Finally, the equivalent expression is: