Calculate the surface area of the line segment \(y=\sqrt{x}\); \(4\leq x\leq9\) rotated about the x-axis. Give your answer in exact form.

He works this problem twice in two videos, using different \(ds\) equations.

Calculate the surface area of the line segment \(y=x^2-\frac{1}{8}\ln(x)\); \(1\leq x\leq2\) rotated about the y-axis. Give your answer in exact form.

Calculate the surface area of the line segment \(y=\sqrt{4-x^2}\); \(-1\leq x\leq1\) rotated about the x-axis. Give your answer in exact form.

Calculate the surface area of the line segment \(f(x)=(1/3)x^3\); \([0,2]\) rotated about the x-axis. Give your answer in exact form.

Calculate the surface area of the line segment \( y=\sqrt{x} \) ; \( 1 \leq x \leq 4 \) rotated about the \(x\)-axis. Give your answer in exact form.

He didn't simplify and factor his answer, so here is the rest of the work.

\(\displaystyle{ A = \frac{\pi}{6}\left[ (17)^{3/2} - (5)^{3/2} \right] }\)

Calculate the surface area of the line segment \(f(x)=\sqrt[3]{x}\); \([0,8]\) rotated about the y-axis. Give your answer in exact form.

Calculate the surface area of the line segment \(y=\sqrt[3]{6x}\); \(0 \leq x \leq 4/3\) rotated about the y-axis. Give your answer in exact form.

Calculate the surface area of the line segment \(f(x)=\sqrt{x}\); \(0\leq x\leq 4\) rotated about the x-axis. Give your answer in exact form.

\([(17)^{3/2}-1]\pi/6\)