Class 12 RD Sharma Solutions – Chapter 23 Algebra of Vectors – Exercise 23.9

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Question 1: Can a vector have direction angles 45°, 60°, and 120°.

Solution:

We know that if l, m and n are the direction cosines and $\alpha$ , $\beta$ and $\gamma$ are the direction angles then,

=> $l = \cos \alpha = \cos 45 \degree = \dfrac{1}{\sqrt{2}}$

=> $m = \cos \beta = \cos 60 \degree = \dfrac{1}{2}$

=> $n = \cos \gamma = \cos 120 \degree = \dfrac{1}{2}$

Also,

=> l²+ m²+ n² = 1

=> $(\dfrac{1}{\sqrt{2}})^2 + (\dfrac{1}{2})^2+ (\dfrac{1}{2})^2 = 1$

=> $\dfrac{1}{2}+\dfrac{1}{4} +\dfrac{1}{4} = 1$

=> As LHS = RHS, the vector can have these direction angles.

Question 2: Prove that 1,1 and 1 can not be the direction cosines of a straight line.

Solution:

Given that, l=1, m=1 and n=1.

We know that,

=> l²+ m²+ n² = 1

=> 1²+ 1²+ 1² = 1

=> 3 ≠ 1

Thus, 1, 1 and 1 can never be the direction cosines of a straight line.

=> Hence proved.

Question 3: A vector makes an angle of $\dfrac{\pi}{4}$ with each of x-axis and y-axis. Find the angle made by it with the z-axis.

Solution:

We know that if l, m and n are the direction cosines and $\alpha$ , $\beta$ and $\gamma$ are the direction angles then,

=> $l = \cos \alpha = \cos 45 \degree = \dfrac{1}{\sqrt{2}}$

=> $m = \cos \beta = \cos 45 \degree = \dfrac{1}{\sqrt{2}}$

Let $\gamma$ be the angle we have to calculate.

We know that,

=> l²+ m²+ n² = 1

=> $n^2 = 1- [(\dfrac{1}{\sqrt{2}})^2+(\dfrac{1}{\sqrt{2}})^2]$

=> n² = 1 – 1

=> n² = 0

=> $\cos^2 \gamma = 0$

=> $\cos \gamma = 0$

=> $\gamma = \cos^{-1}0$

=> $\gamma = \dfrac{\pi}{2}$

Question 4: A vector $\vec{r}$ is inclined at equal acute angles to x-axis, y-axis and z-axis. If $|\vec{r}|$ = 6 units, find $\vec{r}$ .

Solution:

Given that $\alpha=\beta=\gamma$

=> $\cos \alpha = \cos \beta = \cos \gamma$

=> l = m = n = p (say)

We know that,

=> l²+ m²+ n² = 1

=> p²+ p²+ p² = 1

=> 3p² = 1

=> $p = \pm \dfrac{1}{\sqrt{3}}$

The vector $\vec{r}$ can be described as,

=> $\vec{r} = |\vec{r}|(l\hat{i}+m\hat{j}+n\hat{k})$

=> $\vec{r} = 6(\pm \dfrac{1}{\sqrt{3}} \hat{i}+ \pm \dfrac{1}{\sqrt{3}}\hat{j} +\pm \dfrac{1}{\sqrt{3}}\hat{k})$

=> $\vec{r} = \pm2\sqrt{3}(\hat{i}+\hat{j}+\hat{k})$

Question 5: A vector $\vec{r}$ is inclined to the x-axis at 45° and y-axis at 60°. If $|\vec{r}|=8$ units, find $\vec{r}$ .

Solution:

Given that $\alpha = 45 \degree$ and $\beta = 60 \degree$

We know that,

=> l²+ m²+ n² = 1

=> $\cos ^2 \alpha + \cos ^2 \beta + \cos^2 \gamma = 1$

=> $(\dfrac{1}{\sqrt{2}})^2+ (\dfrac{1}{2})^2 + \cos^2 \gamma = 1$

=> $\cos^2 \gamma = 1- [\dfrac{1}{2}+\dfrac{1}{4}]$

=> $\cos ^2 \gamma = 1- \dfrac{3}{4}$

=> $\cos ^2 \gamma = \dfrac{1}{4}$

=> $\cos \gamma = \pm \dfrac{1}{2}$

The vector $\vec{r}$ can be described as,

=> $\vec{r} = |\vec{r}|(l\hat{i}+m\hat{j}+n\hat{k})$

=> $\vec{r} = 8(\dfrac{1}{\sqrt{2}} \hat{i}+ \dfrac{1}{2}\hat{j} +\pm \dfrac{1}{2}\hat{k})$

=> $\vec{r} = 4(\sqrt{2}\hat{i}+\hat{j}+\pm \hat{k})$

Question 6: Find the direction cosines of the following vectors:

(i): $2\hat{i}+ 2\hat{j}-\hat{k}$

Solution:

The direction ratios are given as 2, 2 and -1.

Direction cosines are given as,

=> $\cos \alpha, \cos \beta, \cos \gamma = \dfrac{2}{|\vec{r}|}, \dfrac{2}{|\vec{r}|}, \dfrac{-1}{|\vec{r}|}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{2}{\sqrt{2^2+2^2+(-1)^2}}, \dfrac{2}{\sqrt{2^2+2^2+(-1)^2}}, \dfrac{-1}{\sqrt{2^2+2^2+(-1)^2}}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{2}{3}, \dfrac{2}{3}, \dfrac{-1}{3}$

(ii): $6\hat{i}-2\hat{j}-3\hat{k}$

Solution:

The direction ratios are given as 6, -2 and -3.

Direction cosines are given as,

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{6}{|\vec{r}|}, \dfrac{-2}{|\vec{r}|}, \dfrac{-3}{|\vec{r}|}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{6}{\sqrt{6^2+(-2)^2+(-3)^2}}, \dfrac{-2}{\sqrt{6^2+(-2)^2+(-3)^2}}, \dfrac{-3}{\sqrt{6^2+(-2)^2+(-3)^2}}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{6}{7}, \dfrac{-2}{7}, \dfrac{-3}{7}$

(iii): $3\hat{i}-4\hat{k}$

Solution:

The direction ratios are given as 3, 0 and -4.

Direction cosines are given as,

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{3}{|\vec{r}|}, \dfrac{0}{|\vec{r}|}, \dfrac{-4}{|\vec{r}|}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{3}{\sqrt{3^2+0^2+(-4)^2}}, \dfrac{0}{\sqrt{3^2+0^2+(-4)^2}}, \dfrac{-4}{\sqrt{3^2+0^2+(-4)^2}}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{3}{5}, 0 , \dfrac{-4}{5}$

Question 7: Find the angles at which the following vectors are inclined to each of the coordinates axes.

(i): $\hat{i}-\hat{j}+\hat{k}$

Solution:

The given direction ratios are: 1,-1,1.

Thus,

=> $l, m, n = \dfrac{1}{|\vec{r}|}, \dfrac{-1}{|\vec{r}|}, \dfrac{1}{|\vec{r}|}$

=> $l, m, n = \dfrac{1}{\sqrt{1^2+(-1)^2+1^2}}, \dfrac{-1}{\sqrt{1^2+(-1)^2+1^2}}, \dfrac{1}{\sqrt{1^2+(-1)^2+1^2}}$

=> $l, m, n = \dfrac{1}{\sqrt{3}}, \dfrac{-1}{\sqrt{3}} , \dfrac{1}{\sqrt{3}}$

=> $\cos \alpha , \cos \beta , \cos \gamma = \dfrac{1}{\sqrt{3}}, \dfrac{-1}{\sqrt{3}} , \dfrac{1}{\sqrt{3}}$

=> $\alpha , \beta , \gamma = \cos ^{-1} (\dfrac{1}{\sqrt{3}}), \cos ^{-1} (\dfrac{-1}{\sqrt{3}}), \cos ^{-1} (\dfrac{1}{\sqrt{3}})$

(ii): $\hat{j}-\hat{k}$

Solution:

The given direction ratios are: 0,1,-1.

Thus,

=> $l, m, n = \dfrac{0}{|\vec{r}|}, \dfrac{1}{|\vec{r}|}, \dfrac{-1}{|\vec{r}|}$

=> $l, m, n = \dfrac{0}{\sqrt{0^2+1^2+(-1)^2}}, \dfrac{1}{\sqrt{0^2+1^2+(-1)^2}}, \dfrac{-1}{\sqrt{0^2+1^2+(-1)^2}}$

=> $l, m, n = 0 , \dfrac{1}{\sqrt{2}} , \dfrac{-1}{\sqrt{2}}$

=> $\cos \alpha , \cos \beta , \cos \gamma = 0, \dfrac{1}{\sqrt{2}} , \dfrac{-1}{\sqrt{2}}$

=> $\alpha , \beta , \gamma = \cos ^{-1}(0), \cos ^{-1} (\dfrac{1}{\sqrt{2}}), \cos ^{-1} (\dfrac{-1}{\sqrt{2}})$

=> $\alpha , \beta , \gamma = \dfrac{\pi}{2}, \dfrac{\pi}{4}, \dfrac{3\pi}{4}$

(iii): $4\hat{i}+8\hat{j}+\hat{k}$

Solution:

The given direction ratios are: 4, 8, 1.

Thus,

=> $l, m, n = \dfrac{4}{|\vec{r}|}, \dfrac{8}{|\vec{r}|}, \dfrac{1}{|\vec{r}|}$

=> $l, m, n = \dfrac{0}{\sqrt{4^2+8^2+1^2}}, \dfrac{8}{\sqrt{4^2+8^2+1^2}}, \dfrac{1}{\sqrt{4^2+8^2+1^2}}$

=> $l, m, n = \dfrac{4}{9}, \dfrac{8}{9} , \dfrac{1}{9}$

=> $\cos \alpha , \cos \beta , \cos \gamma = \dfrac{4}{9}, \dfrac{8}{9} , \dfrac{1}{9}$

=> $\alpha , \beta , \gamma = \cos ^{-1}(\dfrac{4}{9}), \cos ^{-1} (\dfrac{8}{9}), \cos ^{-1} (\dfrac{1}{9})$

Question 8: Show that the vector $\hat{i}+\hat{j}+\hat{k}$ is equally inclined with the axes OX, OY and OZ.

Solution:

Let $\vec{r}= \hat{i}+\hat{j}+\hat{k}$

Thus, $|\vec{r}| = \sqrt{1^2+1^2+1^2}$

=> $|\vec{r}| = \sqrt{3}$

Thus the direction cosines are: $\dfrac{1}{|\vec{r}|}$ , $\dfrac{1}{|\vec{r}|}$ and $\dfrac{1}{|\vec{r}|}$

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{1}{\sqrt{3}}, \dfrac{1}{\sqrt{3}}, \dfrac{1}{\sqrt{3}}$

Thus,

=> $\cos \alpha, \cos \beta , \cos \gamma = \dfrac{1}{\sqrt{3}}$

=> Thus, the vector is equally inclined with the 3 axes.

Question 9: Show that the direction cosines of a vector equally inclined to the axes OX, OY and OZ are $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ .

Solution:

Let the vector be equally inclined at an angle of $\alpha$ .

Then the direction cosines of the vector l, m, n are: $\cos \alpha$ , $\cos \beta$ and $\cos \gamma$

We know that,

=> l²+ m²+ n² = 1

=> $\cos^2 \alpha + \cos^2 \alpha+ \cos^2 \alpha = 1$

=> $3\cos^2 \alpha = 1$

=> $\cos \alpha = \pm \dfrac{1}{\sqrt{3}}$

=> Thus the direction cosines are: $\pm \dfrac{1}{\sqrt{3}}$ , $\pm \dfrac{1}{\sqrt{3}}$ , $\pm \dfrac{1}{\sqrt{3}}$ .

Question 10: If a unit vector $\vec{a}$ makes an angle $\dfrac{\pi}{3}$ with $\hat{i}$ , $\dfrac{\pi}{4}$ with $\hat{j}$ and an acute angle $\theta$ with $\hat{k}$ , then find \theta and hence the components of $\vec{a}$ .

Solution:

The unit vector be,

=> $\vec{r} = r_1\hat{i}+r_2\hat{j}+r_3\hat{k}$

=> $r_1 , r_2, r_3 = \cos (\dfrac{\pi}{3}), \cos (\dfrac{\pi}{4}), \cos \theta$

Given that $\vec{r}$ is unit vector,

=> $|\vec{r}| = 1$

=> $\sqrt{r_1^2+r_2^2+ r_3^2 }= 1$

=> $r_1^2+r_2^2+ r_3^2 = 1$

=> $(\cos (\dfrac{\pi}{3}))^2 + (\cos (\dfrac{\pi}{4}))^2 + (\cos \theta)^2 =1$

=> $(\cos \theta)^2 = 1-[\dfrac{1}{2}+\dfrac{1}{4}]$

=> $(\cos \theta)^2 = 1- \dfrac{3}{4}$

=> $(\cos \theta)^2 = \dfrac{1}{4}$

=> $\cos \theta = \dfrac{1}{2}$

=> $\theta = \cos ^{-1} (\dfrac{1}{2})$

=> $\theta = \dfrac{\pi}{3}$

Question 11: Find a vector $\vec{r}$ of magnitude $3\sqrt{2}$ units which makes an angle of $\dfrac{\pi}{4}$ and $\dfrac{\pi}{2}$ with y and z axes respectively.

Solution:

Let l, m, n be the direction cosines of the vector $\vec{r}$ .

We know that,

=> l²+ m²+ n² = 1

=> $\cos ^2 \alpha+ \cos ^2 \beta + \cos ^2 \gamma =1$

=> $l^2 =1 - [(\dfrac{1}{\sqrt{2}})^2+(0)^2]$

=> $l^2 = 1- \dfrac{1}{2}$

=> $l = \pm \dfrac{1}{\sqrt{2}}$

Thus vector is,

=> $\vec{r} = |\vec{r}|(l\hat{i}+m\hat{j}+n\hat{k})$

=> $\vec{r} = 3\sqrt{2}(\pm \dfrac{1}{\sqrt{2}} \hat{i} + \dfrac{1}{\sqrt{2}}\hat{j} + 0\hat{k})$

=> $\vec{r} = \pm 3\hat{i} + 3\hat{j}$

Question 12: A vector $\vec{r}$ is inclined at equal angles to the 3 axes. If the magnitude of $\vec{r}$ is $2\sqrt{3}$ , find $\vec{r}$ .

Solution:

Let l, m, n be the direction cosines of the vector $\vec{r}$ .

Given that the vector is inclined at equal angles to the 3 axes.

=> $l = m = n = \cos \alpha = \cos \beta = \cos \gamma$

We know that,

=> l²+ m²+ n² = 1

=> $3\cos ^2\alpha = 1$

=> $\cos \alpha = \pm \dfrac{1}{\sqrt{3}}$

Hence, the vector is given as,

=> $\vec{r} = |\vec{r}|(l\hat{i}+m\hat{j}+n\hat{k})$

=> $\vec{r} = 2\sqrt{3}(\pm \dfrac{1}{\sqrt{3}}\hat{i}+ \pm \dfrac{1}{\sqrt{3}}\hat{j}+ \pm \dfrac{1}{\sqrt{3}}\hat{k})$

=> $\vec{r} = \pm 2(\hat{i}+\hat{j}+\hat{k})$

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Last Updated : 28 Mar, 2021

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Class 12 RD Sharma Solutions – Chapter 23 Algebra of Vectors – Exercise 23.9

Question 1: Can a vector have direction angles 45°, 60°, and 120°.

Question 2: Prove that 1,1 and 1 can not be the direction cosines of a straight line.

Question 3: A vector makes an angle of $\dfrac{\pi}{4}$ with each of x-axis and y-axis. Find the angle made by it with the z-axis.

Question 4: A vector $\vec{r}$ is inclined at equal acute angles to x-axis, y-axis and z-axis. If $|\vec{r}|$ = 6 units, find $\vec{r}$ .

Question 5: A vector $\vec{r}$ is inclined to the x-axis at 45° and y-axis at 60°. If $|\vec{r}|=8$ units, find $\vec{r}$ .

Question 6: Find the direction cosines of the following vectors:

(i): $2\hat{i}+ 2\hat{j}-\hat{k}$

(ii): $6\hat{i}-2\hat{j}-3\hat{k}$

(iii): $3\hat{i}-4\hat{k}$

Question 7: Find the angles at which the following vectors are inclined to each of the coordinates axes.

(i): $\hat{i}-\hat{j}+\hat{k}$

(ii): $\hat{j}-\hat{k}$

(iii): $4\hat{i}+8\hat{j}+\hat{k}$

Question 8: Show that the vector $\hat{i}+\hat{j}+\hat{k}$ is equally inclined with the axes OX, OY and OZ.

Question 9: Show that the direction cosines of a vector equally inclined to the axes OX, OY and OZ are $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ .

Question 10: If a unit vector $\vec{a}$ makes an angle $\dfrac{\pi}{3}$ with $\hat{i}$ , $\dfrac{\pi}{4}$ with $\hat{j}$ and an acute angle $\theta$ with $\hat{k}$ , then find \theta and hence the components of $\vec{a}$ .

Question 11: Find a vector $\vec{r}$ of magnitude $3\sqrt{2}$ units which makes an angle of $\dfrac{\pi}{4}$ and $\dfrac{\pi}{2}$ with y and z axes respectively.

Question 12: A vector $\vec{r}$ is inclined at equal angles to the 3 axes. If the magnitude of $\vec{r}$ is $2\sqrt{3}$ , find $\vec{r}$ .

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Class 12 RD Sharma Solutions – Chapter 23 Algebra of Vectors – Exercise 23.9

Question 1: Can a vector have direction angles 45°, 60°, and 120°.

Question 2: Prove that 1,1 and 1 can not be the direction cosines of a straight line.

Question 3: A vector makes an angle of with each of x-axis and y-axis. Find the angle made by it with the z-axis.

Question 4: A vector is inclined at equal acute angles to x-axis, y-axis and z-axis. If = 6 units, find .

Question 5: A vector is inclined to the x-axis at 45° and y-axis at 60°. If units, find .

Question 6: Find the direction cosines of the following vectors:

(i):

(ii):

(iii):

Question 7: Find the angles at which the following vectors are inclined to each of the coordinates axes.

(i):

(ii):

(iii):

Question 8: Show that the vector is equally inclined with the axes OX, OY and OZ.

Question 9: Show that the direction cosines of a vector equally inclined to the axes OX, OY and OZ are ,, .

Question 10: If a unit vector makes an angle with , with and an acute angle with, then find \theta and hence the components of .

Question 11: Find a vector of magnitude units which makes an angle of and with y and z axes respectively.

Question 12: A vector is inclined at equal angles to the 3 axes. If the magnitude of is , find .

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CBSE Class 12 Computer Science

GATE CS & IT 2024

Question 3: A vector makes an angle of $\dfrac{\pi}{4}$ with each of x-axis and y-axis. Find the angle made by it with the z-axis.

Question 4: A vector $\vec{r}$ is inclined at equal acute angles to x-axis, y-axis and z-axis. If $|\vec{r}|$ = 6 units, find $\vec{r}$ .

Question 5: A vector $\vec{r}$ is inclined to the x-axis at 45° and y-axis at 60°. If $|\vec{r}|=8$ units, find $\vec{r}$ .

(i): $2\hat{i}+ 2\hat{j}-\hat{k}$

(ii): $6\hat{i}-2\hat{j}-3\hat{k}$

(iii): $3\hat{i}-4\hat{k}$

(i): $\hat{i}-\hat{j}+\hat{k}$

(ii): $\hat{j}-\hat{k}$

(iii): $4\hat{i}+8\hat{j}+\hat{k}$

Question 8: Show that the vector $\hat{i}+\hat{j}+\hat{k}$ is equally inclined with the axes OX, OY and OZ.

Question 9: Show that the direction cosines of a vector equally inclined to the axes OX, OY and OZ are $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ , $\dfrac{1}{\sqrt{3}}$ .

Question 10: If a unit vector $\vec{a}$ makes an angle $\dfrac{\pi}{3}$ with $\hat{i}$ , $\dfrac{\pi}{4}$ with $\hat{j}$ and an acute angle $\theta$ with $\hat{k}$ , then find \theta and hence the components of $\vec{a}$ .

Question 11: Find a vector $\vec{r}$ of magnitude $3\sqrt{2}$ units which makes an angle of $\dfrac{\pi}{4}$ and $\dfrac{\pi}{2}$ with y and z axes respectively.

Question 12: A vector $\vec{r}$ is inclined at equal angles to the 3 axes. If the magnitude of $\vec{r}$ is $2\sqrt{3}$ , find $\vec{r}$ .