- integration - Evaluating $ \int_ {1 2}^ {\infty} \frac {\Gamma (u . . .
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- algebra precalculus - Evaluating $\frac {1} {a^ {2025}}+\frac {1} {b . . .
Well, the image equation is a different equation? One has $\frac1 {2024}$ on the right, and the other has $2024$ on the right?
- Evaluating $ \\lim_{x \\to 0} \\frac{e - (1 + 2x)^{1 2x}}{x} $ without . . .
The following is a question from the Joint Entrance Examination (Main) from the 09 April 2024 evening shift: $$ \lim_ {x \to 0} \frac {e - (1 + 2x)^ {1 2x}} {x} $$ is equal to: (A) $0$ (B) $\frac {-2} {
- integration - Evaluating $\iiint z (x^2+y^2+z^2)^ {−3 2}\,dx\,dy\,dz . . .
Spherical Coordinate Homework Question Evaluate the triple integral of $f (x,y,z)=z (x^2+y^2+z^2)^ {−3 2}$ over the part of the ball $x^2+y^2+z^2\le 81$ defined by
- Evaluating $\\prod_{n=1}^{\\infty}\\left(1+\\frac{1}{2^n}\\right)$
Compute:$$\prod_ {n=1}^ {\infty}\left (1+\frac {1} {2^n}\right)$$ I and my friend came across this product Is the product till infinity equal to $1$? If no, what is the answer?
- Evaluating $\int_0^1 \frac {\tan^ {-1} (x)\ln^2 (x)} {1+x}\,dx$
$$\color {green} {\int_0^1\frac {\ln^2 x\ln (1+x)} {1+x^2}\,dx= -2\Im \text {Li}_4 (i)+\frac {\pi^2}6G+\frac {\pi^3} {32}\ln2} $$ $$\color {red} {\int_0^1\frac {\tan
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