\displaystyle\frac{{4}}{{\sqrt{{{2}}}-{3}\sqrt{{{5}}}}}=-\frac{{4}}{{43}}{\left(\sqrt{{{2}}}+{3}\sqrt{{{5}}}\right)}=-\frac{{4}}{{43}}\sqrt{{{2}}}-\frac{{12}}{{43}}\sqrt{{{5}}} Explanation: The ...

The simplification \displaystyle=\frac{{11}}{{14}}-\frac{{{i}{5}\sqrt{{3}}}}{{14}} Explanation: To simplify a complex numbers, we must multiply by the conjugate of the denominator if \displaystyle{z}=\frac{{z}_{{1}}}{{z}_{{2}}} ...

\displaystyle\frac{{9}}{\sqrt{{2}}} Explanation: \displaystyle\frac{{{9}\sqrt{{25}}}}{\sqrt{{50}}} \displaystyle=\frac{{{9}\times{5}}}{\sqrt{{50}}} \displaystyle\sqrt{{50}} can be ...

\displaystyle{\left(\frac{{{47}\sqrt{{2}}}}{{6}}\right.} Explanation: \displaystyle\frac{{{4}\sqrt{{32}}}}{{3}}+\frac{{{5}\sqrt{{18}}}}{{6}} By calculator \displaystyle{\left(={11.07800624}\right.} ...

In the polynomial, y(1) = 1 regardless of \alpha. In the trig function y(1) = 1, too. This means that the point of tangency, (if there is one) will be at (1,1). Find \frac {dy}{dx} for ...

\displaystyle\frac{{{3}\sqrt{{35}}}}{{7}} Explanation: Given expression, \displaystyle\frac{{{3}\sqrt{{{5}}}}}{\sqrt{{7}}} We get, \displaystyle\frac{{{3}\sqrt{{{5}}}}}{\sqrt{{7}}}\cdot\frac{\sqrt{{7}}}{\sqrt{{7}}}=\frac{{{3}\sqrt{{5}}\cdot\sqrt{{{7}}}}}{{\left(\sqrt{{7}}\right)}^{{2}}}=\frac{{{3}\sqrt{{35}}}}{{7}}