Let x1, . . be independent random variables with the common distribution function f, and suppose they are independent of n, a geometric random variable with parameter p. let m = max(x1, . . ,xn). (a) find p{m … x} by conditioning on n. (b) find p{m … x|n = 1}. (c) find p{m … x|n > 1}. (d) use (b) and (c) to rederive the probability you found in (a).

$450 is the answer.

step-by-step explanation:

30% of 450 = 135

450-135=315

when rotating a figure 180 degrees, imagine that you are able to take the figure and turn it clockwise or counterclockwise around a center point. to rotate a figure 180 degrees, you will need to apply the rule (x, y) → (-x, -y). start by using a coordinate grid with coordinates for each vertex of the figure. the center point of the coordinate grid is located at (0, 0), which is what you will rotate the figure around. write down the original coordinates of the shape you are going to rotate. then, apply the rule. for example, coordinate (1, 2) becomes (-1, -2). another example would be, coordinate (-4, -2) becoming (4, 2). after you change each original coordinate to the rotated coordinate, you will draw your new figure.

step-by-step explanation:

1 1/7 hope i

step-by-step explanation:

8/7 = (1 * 7 + 1) / 7 = 1 + 1/7 = 1 1/7

umm you say your want to . but you do know that this is the mathematics.  

o~o