QuickMath Download on App Store Download on Google Play
Welcome to Quickmath Solvers! Download on App Store Download on Google Play
Created on: 2012-01-24

A sample problem solved by Quickmath online math calculator

Command

Solve

Inequality
abs((3*x-5)/7) >= 3/14

  1. an inequality in which left side of inequality greater than or equal to right side of inequality; the left side of the inequality is equal to absolute value of a quotient: dividend of the quotient is a sum that consists of 2 terms; the 1st term of the sum is equal to a product that contains 2 factors; the 1st factor of the product is equal to three; the 2nd factor of the product is x; the 2nd term of the sum is equal to negative five; divisor of the quotient is seven; the right side of the inequality is equal to a rational expression: the numerator of the rational expression is three; the denominator of the rational expression is fourteen;
  2. absolute value of three multiplied by x plus negative five divided by seven greater or equal than three fraction line fourteen;
Variable
Result
A nonpolynomial inequality has been used, so the solution set may be incorrect.

Exact

<<x = 7/6>> or <<x = 13/6>> or <<x < 7/6>> or <<13/6 < x>>

  1. an inequality in which left side of inequality smaller than right side of inequality. The left side of the inequality is equal to a rational expression: the top of the rational expression is thirteen. The bottom of the rational expression is six. The right side of the inequality is equal to x.
  2. open bracket thirteen over six less than x close bracket.


Approximate

<<x = 1.16667>> or <<x = 2.16667>> or <<x < 1.16667>> or <<2.16667 < x>>

  1. an inequality in which left side of inequality smaller than right side of inequality; the left side of the inequality is equal to two point one six six six seven; the right side of the inequality is equal to x;
  2. open brace two point one six six six seven less than x close brace;