Step 1

There are certain examples for exponents and radical.

Step 2

For exponents, if we lend a money or borrow a money from some one then the total amount is the exponent function of time.

To calculate compound interest, the formula is \(\displaystyle{F}={P}{\left({1}+{i}\right)}^{{{n}}},\) where F is the future value and P is the present value, i is the interest rate and n is the number of years. If you wanted to calculate the compound interest on \(\displaystyle\${1},{000}\) for 18 months at 5 percent, the formula would be \(\displaystyle{F}={1000}{\left({1}+{0.05}\right)}^{{{\frac{{{3}}}{{{2}}}}}}\)

Step 3

For radical, radical expression means calculating angle and sides it can be used in building for accuracy of design and carpentry for making furniture design.

The ratio of the sides of a \(\displaystyle{30}^{{\circ}}-{60}^{{\circ}}-{90}^{{\circ}}\) right triangle is \(\displaystyle{1}:{2}:\sqrt{{{3}}},\) and the ratio of the sides of a \(\displaystyle{40}^{{\circ}}-{45}^{{\circ}}-{90}^{{\circ}}\) right triangle is \(\displaystyle{1}:{1}:\sqrt{{{2}}}\)

There are certain examples for exponents and radical.

Step 2

For exponents, if we lend a money or borrow a money from some one then the total amount is the exponent function of time.

To calculate compound interest, the formula is \(\displaystyle{F}={P}{\left({1}+{i}\right)}^{{{n}}},\) where F is the future value and P is the present value, i is the interest rate and n is the number of years. If you wanted to calculate the compound interest on \(\displaystyle\${1},{000}\) for 18 months at 5 percent, the formula would be \(\displaystyle{F}={1000}{\left({1}+{0.05}\right)}^{{{\frac{{{3}}}{{{2}}}}}}\)

Step 3

For radical, radical expression means calculating angle and sides it can be used in building for accuracy of design and carpentry for making furniture design.

The ratio of the sides of a \(\displaystyle{30}^{{\circ}}-{60}^{{\circ}}-{90}^{{\circ}}\) right triangle is \(\displaystyle{1}:{2}:\sqrt{{{3}}},\) and the ratio of the sides of a \(\displaystyle{40}^{{\circ}}-{45}^{{\circ}}-{90}^{{\circ}}\) right triangle is \(\displaystyle{1}:{1}:\sqrt{{{2}}}\)