se differential, i.e., linear approximation, to approximate (8.4)^(1/3) as follows:

Question

se differential, i.e., linear approximation, to approximate (8.4)^(1/3)  as follows: 
Let f(x)=(x )^(1/3). The linear approximation to f(x) at x=8 can be written in the form y=mx+b where m is:  and where b is:  
Using this, we find our approximation for (8.4)^(1/3)  is

Damon · Answer

y = x^(1/3) dy/dx = (1/3) x^-(1/3) at x = 8 y(8) = 2 dy/dx = (1/3)/2 y(x+h) = y(x) + h dy/dx y(8.4) = 2 + .4 (1/3)/2