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- Question 1, Exercise 2.1
- Question 2, Exercise 2.1
- Question 3, Exercise 2.1
- Question 4, Exercise 2.1
- Question 1, Exercise 2.2
- Question 3, Exercise 2.2
- Question 3, Exercise 2.2
- Question 4, Exercise 2.2
- Question 5, Exercise 2.2
- Question 6, Exercise 2.2
- Question 7, Exercise 2.2
- Question 8, Exercise 2.2
- Question 9, Exercise 2.2
- Question 10, Exercise 2.2
- Question 11, Exercise 2.2
- Question 12, Exercise 2.2
- Question 13, Exercise 2.2
- Question 1, Exercise 2.3
- Question 2, Exercise 2.3
- Question 3, Exercise 2.3
- Question 4, Exercise 2.3
- Question 5, Exercise 2.3
- Question 6, Exercise 2.3
- Question 7, Exercise 2.3
- Question 1, Exercise 2.5
- Question 2, Exercise 2.5
- Question 3, Exercise 2.5
- Question 1, Exercise 2.6
- Question 2, Exercise 2.6
- Question 3, Exercise 2.6
- Question 4, Exercise 2.6
- Question 5, Exercise 2.6
- Question 6, Exercise 2.6
- Question 7 and 8, Exercise 2.6
- Question 9 and 10, Exercise 2.6
- Question 1, Review Exercise
- Question 2 and 3, Review Exercise
- Question 4 and 5, Review Exercise
Fulltext results:
- Question 1, Exercise 2.6
- ====== Question 1, Exercise 2.6 ====== Solutions of Question 1 of Exercise 2.6 of Unit 02: Matrices and... d, Islamabad, Pakistan. =====Question 1(i)===== Solve the system of homogeneous linear equation for non-trivial solution if exists\\ $ 2 x_{1}-3 x_{2}+4 x_{3}=0$\\ $... _{2}+3 x_{3}=0$\\ $4 x_{1}+x_{2}-6 x_{3}=0$\\ ** Solution. ** \begin{align*} &2 x_{1}-3 x_{2}+4 x_{3}=
- Question 3, Exercise 2.6
- ====== Question 3, Exercise 2.6 ====== Solutions of Question 3 of Exercise 2.6 of Unit 02: Matrices and... d, Islamabad, Pakistan. =====Question 3(i)===== Solve the system of linear equation by Gauss eliminat... x+3 y+4 z=2$\\ $2 x+y+z=5$\\ $3 x-2 y+z=-3$\\ ** Solution. ** Given the system of equations: \begin{al... x &= \frac{46}{19} \end{align*} Therefore, the solution to the system is: $$x = \frac{46}{19}, \qu
- Question 5, Exercise 2.6
- ====== Question 5, Exercise 2.6 ====== Solutions of Question 5 of Exercise 2.6 of Unit 02: Matrices and... d, Islamabad, Pakistan. =====Question 5(i)===== Solve the system of linear equation by using Cramer's... }+3 x_{3}=1$\\ $3 x_{1}-7 x_{2}+4 x_{3}=10$\\ ** Solution. ** The above system may be written as $A X=... 2}\\ &= \frac{104}{52} = 2 \end{align*} Thus, the solution set is $(3, 1, 2)$. =====Question 5(ii)==
- Question 2, Exercise 2.6
- ====== Question 2, Exercise 2.6 ====== Solutions of Question 2 of Exercise 2.6 of Unit 02: Matrices and... homogeneous linear equation may have non-trivial solution. Also solve the system for value of $\lambda$.\\ $2 x_{1}-\lambda x_{2}+x_{3}=0$\\ $2 x_{1}+3 x_{2}-x_{3}=0$\\ $3 x_{1}-2 x_{2}+4 x_{3}=0$\\ ** Solution. ** \begin{align*} &2 x_{1}-\lambda x_{2}+x_
- Question 4, Exercise 2.6
- ====== Question 4, Exercise 2.6 ====== Solutions of Question 4 of Exercise 2.6 of Unit 02: Matrices and... d, Islamabad, Pakistan. =====Question 4(i)===== Solve the system of linear equation by Gauss-Jordan m... }+3 x_{3}=7$\\ $4 x_{1}+2 x_{2}-5 x_{3}=10$\\ ** Solution. ** \begin{align*} 2x_1 - x_2 - x_3 &= 2, ... }\quad R_1 + \frac{1}{2}R_2\end{align*} Thus, the solution to the system of equations is: $$\boxed{x_1
- Question 6, Exercise 2.6
- ====== Question 6, Exercise 2.6 ====== Solutions of Question 6 of Exercise 2.6 of Unit 02: Matrices and... , Islamabad, Pakistan. =====Question 6(i)===== Solve the system of linear equation by matrix inversi... +3 y+z=6$\\ $2 x+y+3 z=19$\\ $x+2 y+4 z=25$\\ ** Solution. ** For this system of equations; we have \b... {11} \end{bmatrix} \end{align*} Therefore, the solution to the system of equations is: $$x = \frac{1
- Question 7 and 8, Exercise 2.6
- ====== Question 7 and 8, Exercise 2.6 ====== Solutions of Question 7 and 8 of Exercise 2.6 of Unit 02: ... & -3\end{array}\right]$; find $A^{-1}$ and hence solve the system of equations.\\ $3 x+4 y+7 z=14 ; 2 x-y+3 z=4 ; \quad x+2 y-3 z=0$. ** Solution. ** Given \begin{align*} A &= \begin{bmatri... align*} x_1&=1\\ x_2&=1\\ x_3&=1 \end{align*} Now solutions of above equations are; $$ \begin{bmatrix}
- Question 2, Exercise 2.1
- ====== Question 2, Exercise 2.1 ====== Solutions of Question 2 of Exercise 2.1 of Unit 02: Matrices and... ngular matrix, row matrix or column matrix.\\ ** Solution. ** Rectangular matrix =====Question 1(ii)... ngular matrix, row matrix or column matrix.\\ ** Solution. ** Square matrix =====Question 1(iii)===... ngular matrix, row matrix or column matrix.\\ ** Solution. ** Column matrix =====Question 1(iv)=====
- Question 4, Exercise 2.2
- ====== Question 4, Exercise 2.2 ====== Solutions of Question 4 of Exercise 2.2 of Unit 02: Matrices and... 1 & 0 \\ 0 & 1 \end{array}\right]\end{align} ** Solution. ** Let $ B = \left[\begin{array}{cc} 2 & 1... & 2 \\ 2 & 4 & 1 \\ 1 & 2 & 0\end{bmatrix}.$$ ** Solution. ** =====Question 4(iii)===== If $A=\left[... nd a non-zero matrix $C$ such that $A C=B C$. ** Solution. ** =====Question 4(iv)===== $\left[\begi
- Question 1, Exercise 2.1
- ====== Question 1, Exercise 2.1 ====== Solutions of Question 1 of Exercise 2.1 of Unit 02: Matrices and... lll}1 & 3 & 0 \\ 2 & 0 & 1\end{array}\right]$ ** Solution. ** \begin{align}\text{Order of A}&= 2\time... ll}1 & 2 \\ 2 & 3 \\ 3 & 4\end{array}\right]$ ** Solution. ** \begin{align}\text{Order of B}&= 3\time... egin{array}{l}1 \\ 6 \\ 9\end{array}\right]$. ** Solution. ** \begin{align}\text{Order of C}&= 3\time
- Question 4, Exercise 2.1
- ====== Question 4, Exercise 2.1 ====== Solutions of Question 4 of Exercise 2.1 of Unit 02: Matrices and... \\ \sqrt{5} & 6 \\ 1 & 9 \end{array}\right]$$ ** Solution. ** $$ A^t=\begin{bmatrix} 2 & \sqrt{5} & 1... ay}{cccc} 1 & 6 & 2 & 0 \end{array}\right] $$ ** Solution. ** $$B^t=\left[\begin{array}{c} 1 \\ 6 \\ 2... rray}{ll} 2 & 6 \\ 9 & 2 \end{array}\right]$$ ** Solution. ** $$C^t=\left[\begin{array}{ll} 2 & 9 \\
- Question 1, Exercise 2.5
- ====== Question 1, Exercise 2.5 ====== Solutions of Question 1 of Exercise 2.5 of Unit 02: Matrices and... -6 & 8 & 3 \\ -4 & 6 & 5\end{array}\right]$. ** Solution. ** \begin{align*} & \quad \left[\begin{arr... l}2 & 1 \\ 3 & 2 \\ 1 & 9\end{array}\right]$. ** Solution. ** \begin{align*} & \quad \left[\begin{arra... \ 4 & 7 & 8 \\ -3 & 1 & 3\end{array}\right]$. ** Solution. ** \begin{align*} & \quad \left[\begin{arra
- Question 2, Exercise 2.3
- ====== Question 2, Exercise 2.3 ====== Solutions of Question 2 of Exercise 2.3 of Unit 02: Matrices and... 0\end{array}\right]$ using cofactor method.\\ ** Solution. ** The elements of \(R_1\) are \(a_{11} = ... & 4\end{array}\right]$ using cofactor method. ** Solution. ** The elements of \(R_1\) are \(a_{11} = ... 3 i\end{array}\right]$ using cofactor method. ** Solution. ** The elements of \(R_1\) are \(a_{11} =
- Question 3, Exercise 2.3
- ====== Question 3, Exercise 2.3 ====== Solutions of Question 3 of Exercise 2.3 of Unit 02: Matrices and... ght]$ is singular and which are non-singular. ** Solution. ** \begin{align*} A &= \left[\begin{array}... ght]$ is singular and which are non-singular. ** Solution. ** \begin{align*} A &= \left[\begin{array}... ght]$ is singular and which are non-singular. ** Solution. ** \begin{align*} A &= \left[\begin{array}
- Question 4, Exercise 2.3
- ====== Question 4, Exercise 2.3 ====== Solutions of Question 4 of Exercise 2.3 of Unit 02: Matrices and... \\ 2 & 1 & 8 \\ 0 & 3 & 1\end{array}\right]$. ** Solution. ** \begin{align*} A &= \left[\begin{array}... 1 & 3 \\ \lambda & 2 & 1\end{array}\right]$. ** Solution. ** \begin{align*} A &= \left[\begin{array}... \\ 2 & 1 & 3 \\ 3 & 1 & 2\end{array}\right]$. ** Solution. ** Do yourself =====Question 4(iv)=====