How to find the stationary point of y= x^2-108x^(1/2)+16 and determine the nature of the stationary point?

a). Find stationary point: Stationary point is the point at which the gradient equals zero. So first we must find the gradient and the set it to zero and solve: dy/dx= 2x-54x^(-1/2); now we set this to zero: 2x-54x^(-1/2)=0; 2x=54x^(-1/2) multiply both sides by x^(1/2): 2x^(3/2)=54 so x^(3/2)=27 so x^(1/2) = 3 so x=9. To find y co-ordinate plug x=9 into equation: y=81-324+16= -227 so stationary point : (9,-227) b). To determine nature of secondary point we must find the sign of the second derivative at x=9. First find second derivative: d^2y/dx^2=2+27x^(-3/2), when x=9, d^2y/dx^2=3 therefore as d^2y/dx^2>0 stationary point is a minimum.

Answered by Dylan S. Maths tutor

3996 Views

See similar Maths A Level tutors

Related Maths A Level answers

All answers ▸

f(x) = x^3 + 3x^2 + 5. Find (a) f ′′(x), (b) ∫f(x)dx.


Simplify: (log(40) - log(20)) + log(3)


Find the point of intersection of the lines y=2x-7 and 4y-2=3x


Integrate ((7e^(x/2))/4) with respect to x within the bounds of x=0 and x=2. (Basic introduction to definite integration)


We're here to help

contact us iconContact usWhatsapp logoMessage us on Whatsapptelephone icon+44 (0) 203 773 6020
Facebook logoInstagram logoLinkedIn logo

© MyTutorWeb Ltd 2013–2024

Terms & Conditions|Privacy Policy