Question

How do you find the area of the region bounded by the curves `y=sin(x)`, `y=e^x`, `x=0`, and `x=pi/2` ?

Answer 1

Over the interval `[0,pi/2]` the function `y=e^x` is greater that the function `y=sin(x)`. This is why `y=sin(x)` is subtracted from `y=e^x`.

`int_0^(pi/2)e^x-sin(x)dx`

`=[e^x-(-cos(x))]_0^(pi/2)`

`=[e^x+cos(x)]_0^(pi/2)`

`=[e^(pi/2)+cos(pi/2)-(e^0+cos(0))]`

`=[e^(pi/2)+0-(1+1)]`

`=[e^(pi/2)-(2)]`

`=[e^(pi/2)-2]`

`=2.81048->` Solution