QuickMath Download on App Store Download on Google Play
Welcome to Quickmath Solvers! Download on App Store Download on Google Play
Created on: 2012-03-01

A sample problem solved by Quickmath online algebra calculator

Command

Simplify

Expression
3*(log(x-3)-3/(x-3))

  1. A product comprising 2 factors. The first factor of the product is equal to three. The second factor of the product is equal to a sum that consists of 2 terms. The first term of the sum is equal to log of a sum consisting of 2 terms. The first term of the sum is x. The second term of the sum is negative three. The second term of the sum is equal to a negative fraction: the top of the fraction is three. The bottom of the fraction is a sum consisting of 2 terms. The first term of the sum is x. The second term of the sum is equal to negative three.
  2. three times left bracket logarithm of x plus negative three plus negative three divided by x plus negative three right bracket;
Result
((3*x-9)*log(x-3)-9)/(x-3)

  1. A quotient: dividend of the quotient is a sum containing 2 terms. The first term of the sum is equal to a product that consists of 2 factors. The first factor of the product is equal to a sum consisting of 2 terms. The first term of the sum is equal to a product that comprises 2 factors. The first factor of the product is equal to three. The second factor of the product is x. The second term of the sum is equal to negative nine. The second factor of the product is equal to log of a sum of 2 terms. The first term of the sum is x. The second term of the sum is negative three. The second term of the sum is negative nine. Divisor of the quotient is a sum comprising 2 terms. The first term of the sum is equal to x. The second term of the sum is negative three.
  2. opening bracket three multiplied by x plus negative nine closing bracket times logarithm of x plus negative three plus negative nine fraction line x plus negative three.