If #g(x) = x^2 + bx#, and the tangent to the function at #x = -1# is parallel to the line that goes through #(3, 4)# and #(0, -2)#, what is the value of #b#?

1 Answer
Noah G
Feb 18, 2017

#b = 4#

Explanation:

Start by finding the derivative of #g(x)#.

#g'(x) = 2x + b# since #b# is a constant

Find the slope between the two points now.

#m = (y_2 - y_1)/(x_2 - x_1) = (4 - (-2))/(3 - 0) = 6/3 = 2#

The tangent to #g(x)# at #x= -1# is given by:

#g'(x) = -2 + b#

Since we are given that the tangent line is parallel to the line that passes through the same points, we know the tangent line will have the same slope.

#2 = -2 + b#

#4 = b#

Hopefully this helps!

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