1. Home
  2. >Business Calculus
  3. >Business Derivative Application
Help

Marginal revenue, and maximizing revenue & average revenue

All in One Place

Everything you need for better grades in university, high school and elementary.

Learn with Ease

Made in Canada with help for all provincial curriculums, so you can study in confidence.

Instant and Unlimited Help

Get the best tips, walkthroughs, and practice questions.

0/2
?
Intros
Lessons
  1. Marginal Revenue, and Maximizing Revenue & Average Revenue Overview:
  2. Understanding and Maximizing Marginal Revenue
  3. Understanding and Maximizing Average Revenue
0/8
?
Examples
Lessons
  1. Finding & Maximizing Revenue
    Given the following information, find the marginal revenue and the value of qq which maximizes the revenue:
    1. R(q)=q3+4q+2 R(q)=-q^3+4q+2
    2. R(q)=200q22q R(q)=-\frac{200}{q^2} -2q
    3. p=120q+100 p=- \frac{1}{20} q+100
    4. q=50p2 q= \frac{50-p}{2}
  2. Finding & Maximizing Average Revenue
    Given the following information, find the marginal average revenue and the value of qq which maximizes the average revenue:
    1. R(q)=3q4+18q2+5q R(q)=-3q^4+18q^2+5q
    2. R(q)=2q220 R(q)=-2q^2-20
    3. p=110q+25p= - \frac{1}{10} q+25
    4. q=100p5 q= \frac{100-p}{5}
Topic Notes
?
Marginal Revenue (MR) is the additional revenue that is gained when you increase the unit by one. It is also the derivative of the revenue function. In other words,
MR=R(q)MR=R'(q)

Average Revenue (AR) is the amount of revenue generated per unit. In other words,
AR(q)=R(q)qAR(q)=\frac{R(q)}{q}
In this section, we would want to find the quantity qq, which maximizes revenue and average revenue. To maximize revenue, we would want to solve for:

MR=0MR=0

To maximize average revenue, we would want to solve for:

AR(q)=0AR'(q)=0
Basic Concepts
?
Related Concepts
?