QuickMath Download on App Store Download on Google Play
Welcome to Quickmath Solvers! Download on App Store Download on Google Play
Created on: 2011-12-05

A sample problem solved by Quickmath online math calculator

Command

Join fractions

Expression

4/(x*y^3)+8*y/(x^2*z)

  1. A sum consisting of 2 terms. The first term of the sum is a quotient: dividend of the quotient is four. Divisor of the quotient is a product that consists of 2 factors. The first factor of the product is equal to x. The second factor of the product is a power. The base is y. The exponent is three. The second term of the sum is equal to a fraction: the top of the fraction is a product consisting of 2 factors. The first factor of the product is equal to eight. The second factor of the product is equal to y. The bottom of the fraction is a product that consists of 2 factors. The first factor of the product is equal to a power. The base is x. The exponent is two. The second factor of the product is equal to z.
  2. four divided by x multiplied by y to the power of three plus eight times y divided by x raised to the power two multiplied by z.

Result

4*(x*z+2*y^4)/(x^2*y^3*z)

  1. A fraction: the top of the fraction is a product that contains 2 factors. The first factor of the product is equal to four. The second factor of the product is a sum consisting of 2 terms. The first term of the sum is equal to a product consisting of 2 factors. The first factor of the product is x. The second factor of the product is equal to z. The second term of the sum is equal to a product that comprises 2 factors. The first factor of the product is equal to two. The second factor of the product is a power. The base is y. The exponent is four. The bottom of the fraction is a product that consists of 3 factors. The first factor of the product is equal to a power. The base is x. The exponent is two. The second factor of the product is equal to a power. The base is y. The exponent is three. The third factor of the product is z.
  2. four multiplied by left brace x times z plus two times y to the power of four right brace divided by x raised to the power of two times y exponentiated by three times z;