I am totally stuck on this problem which says:
. . . . .Find the linear approximation of the tangent line to:
. . . . . . . .f(x) = 1 / sqrt[1 - x]
. . . . .at x = 0
I have this:
. . . . .f(0) = 1/sqrt(1 - 0) = 1
. . . . .f(x) = 1/(1 - x)^(1/2)
so:
. . . . .f'(x) = (1-x)^(1/2)(0) - 1(1/2)(1-x)^(-1/2)(1) / (1-x)
I simplified it to:
. . . . .f'(x) = -1(1/2)(1 - x)^(-1/2)(1) / (1 - x)
I know that it sounds really stupid, but I don't know how to simplify it further.
. . . . .Find the linear approximation of the tangent line to:
. . . . . . . .f(x) = 1 / sqrt[1 - x]
. . . . .at x = 0
I have this:
. . . . .f(0) = 1/sqrt(1 - 0) = 1
. . . . .f(x) = 1/(1 - x)^(1/2)
so:
. . . . .f'(x) = (1-x)^(1/2)(0) - 1(1/2)(1-x)^(-1/2)(1) / (1-x)
I simplified it to:
. . . . .f'(x) = -1(1/2)(1 - x)^(-1/2)(1) / (1 - x)
I know that it sounds really stupid, but I don't know how to simplify it further.
