Other Math Archive: Questions from December 03, 2022
-
2 answers
-
\( \begin{array}{lll}y=\sin 90^{\circ} & y=\sin 180^{\circ} & y=\sin 270^{\circ} \quad y=\sin 360^{\circ} \\ y=-\sin 90^{\circ} & y=-\sin 180^{\circ} & y=-\sin 270^{\circ} \quad y=-\sin 360^{\circ} \\2 answers -
Parte I: Halle la determinante de las siguientes matrices usando la definición 1. \( A=\left[\begin{array}{rr}2 & -5 \\ 4 & 3\end{array}\right] \) 2. \( B=\left[\begin{array}{ll}1 & -3 \\ 4 & -9\end{2 answers -
can you please do #1
\( 5.5 \) Exercises Use the Laplace transform to solve each of the following systems of equations. 1. \( \left\{\begin{array}{l}x^{\prime}+y=3 e^{2 t} \\ y^{\prime}+x=0 \\ x(0)=2 \\ y(0)=0\end{array}\2 answers -
can you do #3
5.5 Exercises Use the Laplace transform to solve each of the following systems of equations. 1. \( \left\{\begin{array}{l}x^{\prime}+y=3 e^{2 t} \\ y^{\prime}+x=0 \\ x(0)=2 \\ y(0)=0\end{array}\right.2 answers -
can you do #5 please
5.5 Exercises Use the Laplace transform to solve each of the following systems of equations. 1. \( \left\{\begin{array}{l}x^{\prime}+y=3 e^{2 t} \\ y^{\prime}+x=0 \\ x(0)=2 \\ y(0)=0\end{array}\right.2 answers -
Can you do #7 please
5.5 Exercises Use the Laplace transform to solve each of the following systems of equations. 1. \( \left\{\begin{array}{l}x^{\prime}+y=3 e^{2 t} \\ y^{\prime}+x=0 \\ x(0)=2 \\ y(0)=0\end{array}\right.1 answer -
2 answers
-
2 answers
-
2 answers
-
Find the matrix \( A^{\prime} \) for \( T \) relative to the basis \( B^{\prime} \). \[ \begin{aligned} & T: R^{2} \rightarrow R^{2}, T(x, y)=(5 x-y, 4 x), B^{\prime}=\{(-2,1),(-1,1)\} \\ A^{\prime}=1 answer -
2 answers
-
2 answers
-
Find the matrix \( A^{\prime} \) for \( T \) relative to the basis \( B^{\prime} \). \[ \begin{aligned} & T: R^{2} \rightarrow R^{2}, T(x, y)=(5 x-y, 4 x), B^{\prime}=\{(-2,1),(-1,1)\} \\ A^{\prime}=2 answers -
Calculate ∬Sf(x,y,z)dS For Part of the surface x=z3, where 0≤x,y≤2−32;f(x,y,z)=x ∬Sf(x,y,z)dS=
Calculate \( \iint_{\mathcal{S}} f(x, y, z) d S \) For Part of the surface \( x=z^{3} \), where \( 0 \leq x, y \leq 2^{-\frac{3}{2}} ; \quad f(x, y, z)=x \) \( \iint_{\mathcal{S}} f(x, y, z) d S= \)2 answers