Let x=\sqrt[3]{2}+\sqrt[3]{4} then raising to the 3^{rd} power and expanding the binomial on the right: x^3 = (\sqrt[3]{2})^3 + 3 \cdot \sqrt[3]{2} \cdot \sqrt[3]{4} \cdot (\sqrt[3]{2}+\sqrt[3]{4}) + (\sqrt[3]{4})^3 = 6 x + 6 ...

You should be trying to get from \frac{5}{6} \cdot \frac{1}{2}[1+(\frac{2}{3})^n] + \frac{1}{6}(1 - \frac{1}{2}[1+(\frac{2}{3})^n]) to \frac{1}{2}[1+(\frac{2}{3})^{\bf{n+1}}] because that is the ...

I believe the proper Riemann Sum is \begin{align} \frac1n\sum_{k=1}^nk^{1/2} &=n^{1/2}\sum_{k=1}^n\color{#C00000}{\left(\frac kn\right)^{1/2}}\,\color{#00A000}{\frac1n}\\ &=n^{1/2}\int_0^1\color{#C00000}{x^{1/2}}\,\color{#00A000}{\mathrm{d}x}+O\left(n^{-1/2}\right)\\[3pt] &=\frac23n^{1/2}+O\left(n^{-1/2}\right) \end{align} ...

f(\theta)=a\sec\theta+b\csc\theta,\quad 0<\theta<\frac{\pi}{2} f'(\theta) = a\cdot(-1)\cdot(-\sin\theta)\cdot\sec^2\theta+b\cdot(-1)\cdot(\cos\theta)\cdot\csc^2\theta f'(\theta)= \frac{a\sin\theta}{\cos^2\theta} -\frac{b\cos\theta}{\sin^2\theta} ...

multiplying by 2 and rearranging we get 0=b^2-24b+72 using the quadratic formula we get b_{1,2}=12\pm\sqrt{144-72} can you proceed?

Let us consider only four cases in our analysis. The other missing cases can be analyzed by a similar approach. Let A a real number such that A=a^\frac{2}{3}+b^\frac{2}{3}-1 and g(x)= a\sin x + b\cos x-\cos x\sin x ...