Skip to main content
Pearson+ LogoPearson+ Logo
Tangent Lines and Derivatives
2. Intro to Derivatives / Tangent Lines and Derivatives / Problem 5
Problem 5

The function kk and point VV are given. Determine all points PP on the graph of kk such that the line tangent to kk at PP passes through VV.
k(x)=x2+2x+1k\left(x\right)=x^2+2x+1; V(4,9)V\left(4,9\right)

Learn this concept