# Tyler McAtee

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bio website location Berkeley, CA age 22 member for 2 years, 7 months seen Nov 12 '13 at 2:55 profile views 21

Currently an Electrical Engineering Computer Science student at University of California Berkeley.

 3 How do I get from $-4(x+\frac{1}{2})^2+4$ to $4-(2x+1)^2$? 3 Evaluate : $\int_{-1}^{1}\int_{-\sqrt{1-y^2}}^{0}\frac{dxdy}{1+x^2+y^2}$ 1 Finding the limit $\lim_{n\to \infty}\int^n_0 e^{-\lambda x}\mathrm dx$ 1 Determine the limiting behaviour of $\lim_{x \to \infty}{\frac{\sqrt{x^4+1}}{\sqrt[3]{x^6+1}}}$ 1 Evaluating $\int \left(\frac{3}{5} - \frac{8}{x}\right) \ dx$

# 185 Reputation

 +10 Prove that if $AC^T = |A|I \implies \det C = (\det A)^{n-1}$ +5 Prove that $\int_0^x \int_0^y \int_0^z f(t) dt dz dy = \frac{1}{2} \int_0^x (x-t)^2 f(t) dt$ +25 Finding the limit $\lim_{n\to \infty}\int^n_0 e^{-\lambda x}\mathrm dx$ +10 Determine the limiting behaviour of $\lim_{x \to \infty}{\frac{\sqrt{x^4+1}}{\sqrt[3]{x^6+1}}}$

# 5 Questions

 3 Proving the total number of subsets of S is equal to $2^n$ 2 Prove that if $AC^T = |A|I \implies \det C = (\det A)^{n-1}$ 2 Running into trouble with this differential equation 1 Prove that $\int_0^x \int_0^y \int_0^z f(t) dt dz dy = \frac{1}{2} \int_0^x (x-t)^2 f(t) dt$ 0 Taylor series of $f(x^2)$

# 17 Tags

 5 integration × 5 1 indefinite-integrals 3 calculus × 6 1 sequences-and-series 3 definite-integrals × 2 0 power-series × 2 3 algebra-precalculus 0 differential-equations 2 limits × 2 0 combinatorics

# 2 Accounts

 Mathematics 185 rep 18 Stack Overflow 65 rep 8