What is the equation of the line tangent to f(x)=secx - 2cosx f(x)=secx2cosx at x=pi/3x=π3?

1 Answer
Psykolord1989 .
Nov 25, 2017

Calculate the derivative (slope of the line), and find f(pi/3)f(π3) so you have a point for point slope form to find the line equation.

y = (3sqrt3)x + 1 - (sqrt3)piy=(33)x+1(3)π

Explanation:

To find the equation of the line in question, we need both a point, and a slope. The point will be found by simply finding f(pi/3)f(π3)

f(pi/3) = sec (pi/3) - 2 cos(pi/3) = 1/cos(pi/3)-2cos(pi/3)f(π3)=sec(π3)2cos(π3)=1cos(π3)2cos(π3)

We know, either from use of a calculator or from learning the values of the trig functions for angles such as npi, npi/2, npi/3, npi/4, npi/6nπ,nπ2,nπ3,nπ4,nπ6, that cos(pi/3) = 1/2cos(π3)=12. Thus...

f(pi/3) = 1/(1/2) - 2(1/2) = 2-1 = 1f(π3)=1122(12)=21=1

Thus the point (pi/3, 1)(π3,1) is where our tangent line touches.

For the slope, we must calculate the derivative of the function, and then find the exact derivative at pi/3π3

(df)/dx = secxtanx + 2sinxdfdx=secxtanx+2sinx

If x=pi/3...

(df)/dx (x=pi/3) = sec (pi/3) tan (pi/3) + 2 sin (pi/3) = 1/(1/2) * ((sqrt3)/2)/(1/2) + 2(sqrt3)/2 = 2*sqrt3 + sqrt3 = 3sqrt3

Thus, our tangent line is of the form y=(3sqrt3) x + c_1

Since y(pi/3)=1..., use point slope form...

y-1 = 3sqrt3 (x-pi/3) = 3sqrt3x - pisqrt3 -> y = 3sqrt3x + 1 - sqrt3pi

Thus, the tangent line equation is:

y = (3sqrt3)x + 1 - (sqrt3)pi

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