You lower the function by 4 in the y-direction. Explanation: This is cos(x) graph{cos(x) [-20, 20, -10, 10]} As we lower the graph by 4 it becomes the desired function-- cos(x)-4 graph{cos(x)-4 ...

The inverse function is piecewise and is \displaystyle{x}={2}{k}\pi+{{\cos}^{{-{1}}}{\left({y}-{3}\right)}},{2}{k}\pi\le{x}\le{2}{\left({k}+{1}\right)}\pi,{k}={0},\pm{1},\pm{2},\pm{3},\ldots . See ...

The graph is inserted. Also see the superimposed graphs of y = x and y = cos cos that are compounded into the graph for y = x + cos x.u Explanation: The graph is non-periodic. Yet, it is periodic ...

We have y=\cos(x+y) Differentiating using chain rule \dfrac{\mathrm d y}{\mathrm d x} =−\sin⁡(x+y)(x+y) \; \Rightarrow \dfrac{\mathrm d y}{\mathrm d x}=−\sin⁡(x+y)\left(1+\dfrac{\mathrm d y}{\mathrm d x}\right) ...

\displaystyle{y}=-{x}{\left(\frac{{{5}\sqrt{{{3}}}}}{{2}}\right)}+{\left(\frac{{{5}\pi\sqrt{{{3}}}+{15}}}{{6}}\right)} Explanation: First we need to find the gradient at \displaystyle{x}=\frac{\pi}{{3}} ...

\displaystyle\frac{{d}}{{\left.{d}{x}\right.}}{10}{\cos{{x}}}=-{10}{\sin{{x}}} Explanation: From the rules of differentiation, the derivative of a constant times a function is the constant times ...