Take \displaystyle\lim_{{{x}\to-{1}^{+}}}{f{{\left({x}\right)}}},\lim_{{{x}\to-{1}^{{-}}}}{f{{\left({x}\right)}}} . If these limits are equal, we have continuity at \displaystyle{x}=-{1.} ...

\displaystyle{2925}{x}^{{4}} Explanation: Find the factors of each first. \displaystyle{25}{x}^{{3}}={5}^{{2}}\cdot{x}^{{3}} \displaystyle{45}{x}^{{4}}={3}^{{2}}\cdot{5}\cdot{x}^{{4}} ...

\displaystyle{x}\approx{.4067} Explanation: Given: \displaystyle{x}^{{3}}-{10}{x}+{4}={0} . Problem: Use Newton's method to find the approximate zero \displaystyle{c} , where \displaystyle{f{{\left({c}\right)}}}={0} ...

The function can be written as f(x)=(x+2)^3+2 and with a translation it becomes g(X)=X^3 which is monotonic increasing for any X\in\mathbb{R} Indeed if a<b it follows that a^3<b^3 because a^3-b^3<0\to (a-b)(a^2+ab+b^2) ...

\displaystyle-{5} Explanation: The \displaystyle\text{instantaneous rate of change} is the value of f'(2) \displaystyle\Rightarrow{f}'{\left({x}\right)}=-{6}{x}^{{2}}+{10}{x}-{1} \displaystyle\Rightarrow{f}'{\left({2}\right)}=-{6}{\left({2}\right)}^{{2}}+{10}{\left({2}\right)}-{1}=-{24}+{20}-{1}=-{5}

You can't. Explanation: This theorem just tells you that a polynomial \displaystyle{P} such that \displaystyle{d}{e}{g{{\left({P}\right)}}}={n} has at most \displaystyle{n} different ...