Let S be a square with sides of length x. If we approximate the change in size of the area of S by `h (dA)/(dx)|_(x=x_0)`, when the sides are changed from `x_0` to `x_0 + h`, then the absolute value of the error in our approximation, is

Let S be a sphere with radius r. If we approximate the change of volume of S by h.A| _(r_0) +(h^2)/2(dA)/(dr)|_(r=r_0) where A is surface area, when radius is changed from r_0 to (r_0 + h), then the absolute value of error in our approximation is

Find the approximate change in the surface area of a cube of side x m caused by decreasing the side by 1%.

The change in the surface area S = 6x^(2) of a cube when the edge length varies from x_(0) to x_(0) + dx is

Find the approximate change in the value of (1)/(x^(2)). when x changes from x=2 to x=2.002 .

Find the approximate change in the surface area of a cube of side x m caused by decreasing the side by 1% ?

Find the approximate change in surface area of a cube of side x meters caused by decreasing the sides by 1%

Find the approximate change in the surface area of a cube of side x metre caused by decreasing the side by 1%.

Find the approximate change in the surface area of a cube of side x metres caused by decreasing the side by 1%.