Question

The force applied against a moving object travelling on a linear path is given by `F(x)= cosx + 2`. How much work would it take to move the object over `x in [ 0, (13 pi) / 8 ]`?

Answer 1

`W=(4sin(13/8pi)+13pi)/4 ~~ 2.286`

Explanation:

Given: Force, `F(x)=cos(x)+2`
Required: Work done over `x in [0,(13pi)/8]`
Solution Strategy: Use the Work/ Force formula:
`dW = vecF*vecdr; W= F_x*dx + F_y*dy+F_z*dz= |F_x|*dx`
Since `vecF = F_x` only then we integrate in `dx` only:
`W = int_0^(13/8pi) F_x*dx=int_0^(13/8pi) (cosx +2)*dx`
`W=(4sin(13/8pi)+13pi)/4 ~~ 2.286`