\displaystyle{y}={9}{x}+{4} Explanation: To find a line, we must know its slope and one of its points. The slope is given by the derivative evaluated at the requested point, so we have \displaystyle{f}'{\left({x}\right)}=-{4}{x}+{5}\Rightarrow{f}'{\left(-{1}\right)}={4}+{5}={9} ...

\displaystyle{y}=-{2}{\left({x}-\frac{{5}}{{4}}\right)}^{{2}}+\frac{{97}}{{8}} is the equation of the function in vertex form. Explanation: You must complete the square to achieve this task. \displaystyle{y}=-{2}{\left({x}^{{2}}-\frac{{5}}{{2}}{x}\right)}+{9} ...

\displaystyle{f{{\left({x}\right)}}}=-{4}{\left({x}+{2}\right)}^{{2}}+{19} Explanation: \displaystyle\text{for the standard form of a parabola }\ {y}={a}{x}^{{2}}+{b}{x}+{c} \displaystyle\text{the x-coordinate of the vertex is }\ {x}_{{\text{vertex}}}=-\frac{{b}}{{{2}{a}}} ...

If f(x) = -2x^2 + 4x+6, then f(y) = -2y^2 + 4y + 6, f(z) = -2z^2 + 4z + 6, and so on. It's just a symbol! So f(x+h) = -2(x+h)^2 + 4(x+h) + 6, so if you want to compute the slope of this ...

The vertex is \displaystyle{\left(\frac{{5}}{{4}},-\frac{{31}}{{8}}\right)} . Explanation: \displaystyle{f{{\left({x}\right)}}}=-{2}{x}^{{2}}+{5}{x}-{7} is a quadratic equation in standard ...

\displaystyle{y}=-{2}{\left({x}-\frac{{5}}{{4}}\right)}^{{2}}-\frac{{39}}{{8}} Explanation: Given - \displaystyle{y}=-{2}{x}^{{2}}+{5}{x}-{8} X-co-ordinate of the vertex \displaystyle{x}=\frac{{-{b}}}{{{2}{a}}}=\frac{{-{\left({5}\right)}}}{{{2}\times{\left(-{2}\right)}}}=\frac{{-{5}}}{{-{4}}}=\frac{{5}}{{4}} ...