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Created on: 2011-11-23

A sample problem solved by Quickmath online algebra calculator

sqrt(x-y)*(5*y+x)/(6*sqrt(j)) simplified

Command

Join fractions

Expression

1/(x+1)+3*x/(x-2)+9

Visually impaired math text interpretations:
  1. A sum that contains 3 terms; the 1st term of the sum is equal to a quotient: dividend of the quotient is one; divisor of the quotient is a sum containing 2 terms; the 1st term of the sum is x; the 2nd term of the sum is equal to one; the 2nd term of the sum is equal to a rational expression: the top of the rational expression is a product of 2 factors; the 1st factor of the product is equal to three; the 2nd factor of the product is x; the bottom of the rational expression is a sum of 2 terms; the 1st term of the sum is equal to x; the 2nd term of the sum is equal to negative two; the 3rd term of the sum is equal to nine;
  2. one over opening bracket x plus one closing bracket plus three multiplied by x fraction line opening parenthesis x plus negative two closing parenthesis plus nine.

Result

(12*x^2-5*x-20)/((x+1)*(x-2))

Visually impaired math text interpretations:
  1. A quotient: dividend of the quotient is a sum of 3 terms. The 1st term of the sum is equal to a product that comprises 2 factors. The 1st factor of the product is equal to twelve. The 2nd factor of the product is a power. The base is x. The exponent is two. The 2nd term of the sum is a negative product comprising 2 factors. The 1st factor of the product is equal to five. The 2nd factor of the product is equal to x. The 3rd term of the sum is negative twenty. Divisor of the quotient is a product that contains 2 factors. The 1st factor of the product is equal to a sum that contains 2 terms. The 1st term of the sum is x. The 2nd term of the sum is equal to one. The 2nd factor of the product is a sum that comprises 2 terms. The 1st term of the sum is x. The 2nd term of the sum is negative two.
  2. opening brace twelve times x raised to the power two plus negative five times x plus negative twenty closing brace divided by opening square bracket left brace x plus one right brace times opening brace x plus negative two closing brace closing square bracket.