Other Math Archive: Questions from April 29, 2023
-
2 answers
-
3. Determine si \( T: \mathbb{R}^{3} \rightarrow \mathbb{R}^{3} \) definida pof \[ T(x, y, z)=(x+y, y+z, x+z) \] es invertible. Si lo es, hallar su inversa.2 answers -
7.1 Autovalores y Autovectores 1. Hallar los autovalores y correspondientes autovectores de la siguiente matriz. \[ A=\left[\begin{array}{ccc} 1 & 2 & -2 \\ -2 & 5 & -2 \\ -6 & 6 & -3 \end{array}\righ0 answers -
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
0 answers
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
0 answers
-
1 answer
-
0 answers
-
1 answer
-
1 answer
-
Encuentra las derivadas solicitadas: 1. Si \( f(x)=\left(4 X+\left(X^{2}+6\right)^{\wedge 1 / 2}\right)^{4} \) Encuentra \( f^{1}(X) \) 2. \( f(X)=\left(8 X^{3}+27\right)^{1 / 3} \) Encuentra \( f^{1}2 answers -
Asignación de Integración de funciones hiperbólicas inversas 1) \( \int \frac{d x}{\sqrt{4 x^{2}}+1} \). utilizar en la respuesta \( \sin h^{-1} \) 2) \( \int \frac{d x}{1-4 x^{2}} \) utilizar en l2 answers -
\( \begin{array}{l}y^{(3)}-3 y^{\prime \prime}+9 y^{\prime}+13 y=0 \\ c_{1} e^{-x}+c_{2} e^{2 x} \cos 3 x+c_{3} e^{2 x} \sin 3 x \\ c_{1} e^{x}+c_{2} e^{2 x} \cos 3 x+c_{3} e^{2 x} \sin 3 x \\ c_{1} e2 answers -
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
6.3 Matrices Asociadros Transformacions Lineales (1) Sea \( T: \mathbb{R}^{3} \rightarrow \mathbb{R}^{2} \) de finida por \[ T(x y z=(x-y, y-z) \] Hallar una representición matricial de toon respecto2 answers -
1 answer
-
0 answers
-
1 answer
-
1 answer
-
1 answer
-
Asignación de Integración de funciones hiperbólicas inversas 1) \( \int \frac{d x}{\sqrt{4 x^{2}}+1} \) utilizar en la respuesta \( \sin h^{-1} \)2 answers -
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer
-
1 answer