What is 93/33 Divided By 7/1

Answer: 9333÷71\frac{93}{33}\div\frac{7}{1} = 3177\frac{31}{77}

Solving 9333÷71\frac{93}{33}\div\frac{7}{1}

  • Rewrite the Division as Multiplication by the Reciprocal:

9333÷71=9333×17\frac{93}{33} \div \frac{7}{1} = \frac{93}{33} \times \frac{1}{7}

  • Multiply the Numerators: 93×1=9393 \times 1 = 93
  • Multiply the Denominators: 33×7=23133 \times 7 = 231
  • Form the New Fraction: 9333×71=93231\frac{93}{33} \times \frac{7}{1} = \frac{93}{231}

Let's Simplify 93231\frac{93}{231}

  • Find the Greatest Common Divisor (GCD) of 9393 and 231231. The GCD of 9393 and 231231 is 33.
  • Divide both the numerator and the denominator by the GCD:93÷3231÷3=3177\frac{93 \div 3}{231 \div 3} = \frac{31}{77}

Answer 9333÷71=3177\frac{93}{33}\div\frac{7}{1} = \frac{31}{77}


The following animation demonstrates the divide-by,

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