topic badge
AustraliaVIC
VCE 11 Methods 2023

10.04 Optimisation

Interactive practice questions

Consider the parabola with equation $y=x^2-4x+6$y=x24x+6.

a

The vertex of a parabola is located where the derivative is $0$0. If we set the derivative of the given parabola to $0$0, we get $2x-4=0$2x4=0.

Solve this equation to find the $x$x-coordinate of the vertex.

b

Find the $x$x-coordinate of the vertex using the formula $x=-\frac{b}{2a}$x=b2a.

c

Find the $y$y-coordinate of the vertex.

d

Which of the following statements is true?

The gradient of the tangent to the parabola is positive at $\left(2,2\right)$(2,2).

A

There is a turning point at $\left(2,2\right)$(2,2).

B

The gradient of the tangent to the parabola is negative at $\left(2,2\right)$(2,2).

C
Easy
4min

The height at time $t$t of a ball thrown upwards is given by the equation $h=59+42t-7t^2$h=59+42t7t2.

Easy
3min

A function $f:\left[-7,5\right]\to\mathbb{R}$f:[7,5] is given by $f\left(x\right)=-6x^2-12x+90$f(x)=6x212x+90.

Medium
4min

A rectangle is constructed such that the sum of its length and width is $20$20. Let the length of the rectangle be $x$x.

Easy
3min
Sign up to access Practice Questions
Get full access to our content with a Mathspace account

Outcomes

U2.AoS3.5

applications of differentiation, including finding instantaneous rates of change, stationary values of functions, local maxima or minima, points of inflection, analysing graphs of functions including motion graphs, and solving maximum and minimum problems with consideration of modelling domain and local and global maxima and minima

U2.AoS3.14

use derivatives to assist in the sketching of graphs of simple polynomial functions and to solve simple maximum and minimum optimisation problems

What is Mathspace

About Mathspace