52,31 / (1- 0.03)
MathBot Answer:
The sum of \(52\) and \(\frac{31}{1 - 0.03}\) is:
\[\begin{aligned}&=\left(52\right) + \left(\frac{31}{1 - 0.03}\right) \\\\ &= \frac{31}{1 - 3 \cdot \frac{1}{100}} + 52 \\\\ &= \frac{8144}{97} \\\\\end{aligned}\]
The difference of \(52\) and \(\frac{31}{1 - 0.03}\) is:
\[\begin{aligned}&=\left(52\right) - \left(\frac{31}{1 - 0.03}\right) \\\\ &= 52 - \frac{31}{1 - 3 \cdot \frac{1}{100}} \\\\ &= \frac{1944}{97} \\\\\end{aligned}\]
The product of \(52\) and \(\frac{31}{1 - 0.03}\) is:
\[\begin{aligned}&=\left(52\right) \cdot \left(\frac{31}{1 - 0.03}\right) \\\\ &= \frac{1612}{1 - 3 \cdot \frac{1}{100}} \\\\ &= \frac{161200}{97} \\\\\end{aligned}\]
The quotient of \(52\) and \(\frac{31}{1 - 0.03}\) is:
\[\begin{aligned}&= \frac{\left(52\right)}{\left(\frac{31}{1 - 0.03}\right)} \\\\ &= \frac{1261}{775} \\\\\end{aligned}\]