How do you find the equation of a line tangent to the function #y=sqrt(2x+1)# at x=4?

1 Answer
Feb 6, 2017

The tangent has equation #y = 1/3x + 5/3#.

Explanation:

Start by finding the corresponding y-coordinate.

#y = sqrt(2(4) + 1) = sqrt(9) = 3#

Find the derivative.

Let #y= sqrt(u)# and #u = 2x + 1#. Then #dy/(du) = 1/(2sqrt(u))# nad #(du)/dx = 2#. By the chain rule, #dy/dx = dy/(du) * (du)/dx = 1/(2sqrt(u)) * 2 = 1/sqrt(u) = 1/sqrt(2x + 1)#.

Find the slope of the tangent by evaluating the point within the derivative.

#y= 1/sqrt(2(4) + 1) = 1/sqrt(9) = 1/3#

The equation of the tangent is therefore:

#y - y_1 = m(x - x_1)#

#y - 3 = 1/3(x - 4)#

#y -3 = 1/3x - 4/3#

#y = 1/3x - 4/3 + 3#

#y = 1/3x + 5/3#

Hopefully this helps!