GMATD11 wrote:
Max (x,y) is defined as the maximum of x and y, and Min(x,y) is defined as the minimum of x and y. What is the average of Max(x,60) and Min(40,x) ?
(1) Min(x, 60) = x
(2) Max(40, x) = x
guys my question is how to rephrase this question and consider the possible values of x
i have considered the possible values of x
if x>60 then max(x,60)=x and min(40,x)=40
if x<40 then max(x,60)=60 and min(40,x)=x
if 40<x<60 then max(x,60)= 60 and min(40,x) =x
i have doubt in last two considered values.
First of all: max(x,y) and min(x,y) are just some functions defined as:
max(x,y)=the maximum of x and y and
min(x,y)=the minimum of x and y.
Max (x,y) is defined as the maximum of x and y, and Min(x,y) is defined as the minimum of x and y. What is the average of Max(x,60) and Min(40,x) ?Question is: \(average=\frac{min(40,x)+max(x,60)}{2}=?\). Consider the following three cases:
If \(x<{40}\) then \(min(40,x)=x\), \(max(x,60)=60\) and \(average=\frac{x+60}{2}=?\);
If \(40<x<60\) then \(min(40,x)=40\), \(max(x,60)=60\) and \(average=\frac{40+60}{2}=50\);
If \(x>{60}\) then \(min(40,x)=40\), \(max(x,60)=x\) and \(average=\frac{40+x}{2}=?\).
(1) Min(x,60)=x --> just says that \(x<60\), so we have either the first or the second case. Not sufficient.
(2) Max(40,x)=x --> just says that \(x>40\), so we have either the second or the third case. Not sufficient.
(1)+(2) \(40<x<60\) so we have the second case: \(min(40,x)=40\), \(max(x,60)=60\) and \(average=\frac{40+60}{2}=50\). Sufficient.
Answer: C.
Hope it helps.
P.S. You could just plug some different values of x to get the three cases, for example: x=30<40, 40<(x=50)<60 and x=70>60.