SATHEE: Exercise 01

03 మాత్రికలు

వ్యాయామం 01

Question:

Construct a 2×2 matrix, A= $\begin{matrix} {[a}_{ij} & ] \end{matrix}$ , whose elements are given by: (i) $\begin{matrix} a_{ij} \end{matrix}$ = $\begin{matrix} {(i+j)}^{2} \end{matrix}$ /2 (ii) $\begin{matrix} a_{ij} \end{matrix}$ =i/j (iii) $\begin{matrix} a_{ij} \end{matrix}$ = $\begin{matrix} {(i+2j)}^{2} \end{matrix}$ /2

Answer:

(i) A = $\begin{matrix} 1 & 3 \\ 2 & 4 \end{matrix}$

(ii) A = $\begin{matrix} 1 & 1/2 \\ 2 & 1 \end{matrix}$

(iii) A = $\begin{matrix} 1 & 7/4 \\ 2 & 4 \end{matrix}$

Question:

In the matrix, write : A= $[\begin{matrix} 2 & 5 & 19 & -7 \\ 35 & -2 & 5/2 & 12 \\ √3 & 1 & -5 & 17 \end{matrix}]$ (i) The order of the matrix (ii) The number of elements (iii) Write the elements a13,a21,a33,a24,a23

Answer:

(i) The order of the matrix is 3x4

(ii) The number of elements is 12

(iii) a13 = √3, a21 = 35, a33 = 17, a24 = 12, a23 = 5/2

Question:

If a matrix has 18 elements , what are the possible orders it can have? what, if it has 5 elements?

Answer:

If a matrix has 18 elements, the possible orders it can have are 2x9, 3x6, 6x3, 9x2.

If a matrix has 5 elements, the possible orders it can have are 1x5, 5x1.

Question:

Which of the given values of x and y make the following pair of matrices equal. $[\begin{matrix} 3x+7 & 5 \\ y+1 & 2-3x \end{matrix}]$ = $[\begin{matrix} 0 & y-2 \\ 8 & 4 \end{matrix}]$ A x=−1/3,y=7 B Not possible to find C y=7,x=−2/3 D x=−1/3,y=−2/3

Answer:

The answer is C. y=7, x=-2/3

Question:

The number of all possible matrices of order 3×3 with each entry 0 or 1 is: A 27 B 18 C 81 D 512

Answer:

Answer: C 81

Question:

Find the value of x,y and z from the following equation: (i) $[\begin{matrix} 4 & 3 \\ x & 5 \end{matrix}]$ = $[\begin{matrix} y & z \\ 1 & 5 \end{matrix}]$ (ii) $[\begin{matrix} x+y & 2 \\ 5+z & xy \end{matrix}]$ = $[\begin{matrix} 6 & 2 \\ 5 & 8 \end{matrix}]$ (iii) $[\begin{matrix} x+y+z \\ x+z \\ y+z \end{matrix}]$ = $[\begin{matrix} 9 \\ 5 \\ 7 \end{matrix}]$

Answer:

Solution:

(i) 4x + 3y = 5z

Substituting the given values, we get

4(4) + 3y = 5z

16 + 3y = 5z

3y = 5z - 16

y = (5z - 16)/3

(ii) x + y + 2 = 6

Substituting the value of y from step (i), we get

x + (5z - 16)/3 + 2 = 6

x + 5z - 16 + 6 = 18

x + 5z = 34

(iii) x + y + z = 9

Substituting the value of y from step (i), we get

x + (5z - 16)/3 + z = 9

x + 5z - 16 + 3z = 27

4z = 27 - x - 16

z = (27 - x - 16)/4

Substituting the value of z in equation (ii), we get

x + 5(27 - x - 16)/4 = 34

4x + 135 - 5x - 80 = 136

x = 25

Substituting the value of x in equation (i) and (iii), we get

y = (5(27) - 16)/3 = 33

z = (27 - 25 - 16)/4 = 3

Hence, x = 25, y = 33 and z = 3

Question:

If a matrix has 24 elements, what are the possible order it can have? What, if it has 13 elements?

Answer:

If a matrix has 24 elements, it can have an order of 2 x 12, 3 x 8, 4 x 6, 6 x 4, 8 x 3, or 12 x 2.

If a matrix has 13 elements, it can have an order of 1 x 13, 2 x 6.5, 3 x 4.5, 4 x 3.25, 5 x 2.6, 6 x 2.16, or 13 x 1.

Question:

Find the value of a,b,c and d from the equation: <math xmlns = “http://www.w3.org/1998/Math/MathML"[a-b2a+c2a-b3c+d ]= $[\begin{matrix} -1 & 5 \\ 0 & 13 \end{matrix}]$

Answer:

Step 1: Rewrite the equation as a system of linear equations.

a - b = -1 2a + c = 5 2a - b = 0 3c + d = 13

Step 2: Solve for a in the first and third equations by adding them together.

a - b + 2a - b = -1 + 0 3a = -1 a = -1/3

Step 3: Substitute the value of a in the second equation and solve for c.

2(-1/3) + c = 5 -2/3 + c = 5 c = 5 + 2/3

Step 4: Substitute the values of a and c in the fourth equation and solve for d.

3(5 + 2/3) + d = 13 15 + 2 + d = 13 d = 1

Question:

Construct a 3×4 matrix, whose elements are given by (i) $\begin{matrix} a_{ij} \end{matrix}$ =1/2∣−3i+j∣ (ii) $\begin{matrix} a_{ij} \end{matrix}$ =2i−j