We must the tangent line at x = 3 of the function:
[tex]f(x)=(\ln x)^3.[/tex]The tangent line is given by:
[tex]y=m*(x-h)+k.[/tex]Where:
• m is the slope of the tangent line of f(x) at x = h,
,• k = f(h) is the value of the function at x = h.
In this case, we have h = 3.
1) First, we compute the derivative of f(x):
[tex]f^{\prime}(x)=\frac{d}{dx}((\ln x)^3)=3*(\ln x)^2*\frac{d}{dx}(\ln x)=3*(\ln x)^2*\frac{1}{x}=\frac{3(\ln x)^2}{x}.[/tex]2) By evaluating the result of f'(x) at x = h = 3, we get:
[tex]m=f^{\prime}(3)=\frac{3}{3}*(\ln3)^2=(\ln3)^2.[/tex]3) The value of k is:
[tex]k=f(3)=(\ln3)^3[/tex]4) Replacing the values of m, h and k in the general equation of the tangent line, we get:
[tex]y=(\ln3)^2*(x-3)+(\ln3)^3.[/tex]Plotting the function f(x) and the tangent line we verify that our result is correct:
AnswerThe equation of the tangent line to f(x) and x = 3 is:
[tex]y=(\ln3)^2*(x-3)+(\ln3)^3[/tex]
