{"id":27931,"date":"2019-10-19T11:41:55","date_gmt":"2019-10-19T06:11:55","guid":{"rendered":"http:\/\/mycbseguide.com\/blog\/?p=27931"},"modified":"2019-10-25T11:52:20","modified_gmt":"2019-10-25T06:22:20","slug":"cbse-class-12-mathematics-vector-algebra-extra-questions","status":"publish","type":"post","link":"https:\/\/mycbseguide.com\/blog\/cbse-class-12-mathematics-vector-algebra-extra-questions\/","title":{"rendered":"CBSE Class 12 Mathematics Vector Algebra Extra Questions"},"content":{"rendered":"

CBSE Class 12 Mathematics Vector Algebra Extra Questions. <\/strong>myCBSEguide has just released Chapter Wise Question Answers for class 12 Maths. There chapter wise Practice Questions with complete solutions are available for download in\u00a0myCBSEguide<\/a>\u00a0<\/strong>website and mobile app. These Questions with solution are prepared by our team of expert teachers who are teaching grade in CBSE schools for years. There are around 4-5 set of solved Chapter 10 Vector Algebra Mathematics Extra Questions from each and every chapter. The students will not miss any concept in these Chapter wise question that are specially designed to tackle Board Exam. We have taken care of every single concept given in CBSE Class 12 Mathematics syllabus<\/a><\/strong>\u00a0and questions are framed as per the latest marking scheme and blue print issued by CBSE for class 12.<\/p>\n

Class 12 Chapter 10 Maths Extra Questions<\/strong><\/p>\n

Download as PDF<\/a><\/strong><\/p>\n

Vector Algebra Extra Questions Class 12 Maths<\/h2>\n

Chapter 10 Vector Algebra<\/strong><\/p>\n

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  1. \n
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    \n

    Find the angle between two vectors {tex}\\vec a{\/tex}<\/span> and {tex}\\vec b{\/tex}<\/span> with magnitudes {tex}\\sqrt 3 {\/tex}<\/span> and 2, respectively, having {tex}\\vec a\\;.\\vec b = \\sqrt 6 {\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n

    \n
    \n
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      \n
    1. {tex}\\frac{\\pi }{5}{\/tex}<\/span><\/li>\n
    2. {tex}\\frac{\\pi }{3}{\/tex}<\/span><\/span><\/li>\n
    3. {tex}\\frac{\\pi }{2}{\/tex}<\/span><\/span><\/li>\n
    4. {tex}\\frac{\\pi }{4}{\/tex}<\/span><\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n
    5. \n
      \n
      \n

      Find the angle between two vectors {tex}\\hat i – 2\\hat j + 3\\hat k{\/tex}<\/span>and {tex}3\\hat i – 2\\hat j + \\hat k\\;{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n

      \n
      \n
      \n
        \n
      1. {tex}{\\cos ^{ – 1}}\\left( {\\frac{4}{7}} \\right){\/tex}<\/span><\/li>\n
      2. {tex}{\\cos ^{ – 1}}\\left( {\\frac{6}{7}} \\right){\/tex}<\/span><\/span><\/li>\n
      3. {tex}{\\cos ^{ – 1}}\\left( {\\frac{5}{9}} \\right){\/tex}<\/span><\/span><\/li>\n
      4. {tex}{\\cos ^{ – 1}}\\left( {\\frac{5}{7}} \\right){\/tex}<\/span><\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n
      5. \n
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        Vector has<\/p>\n<\/div>\n<\/div>\n

        \n
        \n
        \n
          \n
        1. direction<\/li>\n
        2. None of these<\/li>\n
        3. magnitude<\/li>\n
        4. magnitude as well as direction<\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n
        5. \n
          \n
          \n

          Find the sum of the vectors{tex}\\vec a = \\hat i – 2\\hat j + \\hat k,\\;\\vec b = – 2\\hat i + 4\\hat j + 5\\hat k\\;{\/tex}<\/span> and {tex}\\vec c = \\hat i – 6\\hat j – 7\\hat k{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n

          \n
          \n
          \n
            \n
          1. {tex} – \\hat i + 4\\hat j – \\hat k{\/tex}<\/span><\/li>\n
          2. {tex} – 4\\hat j – \\hat k{\/tex}<\/span><\/li>\n
          3. {tex} – \\hat i – 4\\hat j – \\hat k{\/tex}<\/span><\/li>\n
          4. {tex}\\hat i – 4\\hat j – \\hat k{\/tex}<\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n
          5. \n
            \n
            \n

            Find the direction cosines of the vector {tex}\\hat i + 2\\hat j + 3\\hat k{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n

            \n
            \n
            \n
              \n
            1. {tex}\\frac{1}{{\\sqrt {14} }},\\;\\frac{2}{{\\sqrt {14} }},\\;\\frac{3}{{\\sqrt {14} }}{\/tex}<\/span><\/li>\n
            2. {tex}\\frac{1}{{\\sqrt {14} }},\\;\\frac{2}{{\\sqrt {14} }},\\; – \\frac{3}{{\\sqrt {14} }}{\/tex}<\/span><\/li>\n
            3. {tex}\\frac{1}{{\\sqrt {14} }},\\; – \\frac{2}{{\\sqrt {14} }},\\;\\frac{3}{{\\sqrt {14} }}{\/tex}<\/span><\/li>\n
            4. {tex} – \\frac{1}{{\\sqrt {14} }},\\;\\frac{2}{{\\sqrt {14} }},\\;\\frac{3}{{\\sqrt {14} }}{\/tex}<\/span><\/li>\n<\/ol>\n<\/div>\n<\/div>\n<\/div>\n<\/li>\n
            5. The values of k which\u00a0{tex}|k \\vec a | <|\\vec a|{\/tex}<\/span>\u00a0and\u00a0{tex}k \\vec a + \\frac{1}{2}\\vec a{\/tex}<\/span>\u00a0is parallel to\u00a0{tex}\\vec a {\/tex}<\/span>\u00a0holds true are ________.<\/li>\n
            6. If\u00a0{tex}\\vec r. \\vec a = 0{\/tex}<\/span>,\u00a0{tex}\\vec r. \\vec b = 0{\/tex}<\/span>, and\u00a0{tex}\\vec r. \\vec c = 0{\/tex}<\/span>\u00a0for some non-zero vector\u00a0{tex}\\vec r{\/tex}<\/span>, then the value of\u00a0{tex}\\vec a (\\vec b \\times \\vec c){\/tex}<\/span>\u00a0is ________.<\/li>\n
            7. The angle between two vectors\u00a0{tex}\\vec a{\/tex}<\/span>\u00a0and\u00a0{tex}\\vec b{\/tex}<\/span>\u00a0with magnitudes\u00a0{tex}\\sqrt 3{\/tex}<\/span>\u00a0and 4, respectively,\u00a0{tex}\\vec a.\\vec b{\/tex}<\/span>\u00a0=\u00a0{tex}2 \\sqrt 3{\/tex}<\/span> is ________.<\/li>\n
            8. \n
              \n
              \n

              Find {tex}\\vec a \\times \\vec b{\/tex}<\/span> if {tex}\\vec a = 2\\hat i + \\hat j + 3\\hat k,\\vec b = 3\\hat i + 5\\hat j – 2\\hat k{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            9. \n
              \n
              \n

              Find the projection of {tex}\\vec { a } \\text { on } \\vec { b },{\/tex}<\/span> if {tex}\\vec { a } \\cdot \\vec { b } = 8 {\/tex}<\/span> and {tex}\\vec { b } = 2 \\hat { i } + 6 \\hat { j } + 3 \\hat { k }.{\/tex}<\/span><\/p>\n<\/div>\n<\/div>\n<\/li>\n

            10. \n
              \n
              \n

              {tex}\\vec a{\/tex}<\/span> Is unit vector and {tex}\\left( {\\vec x – \\vec a} \\right)\\left( {\\vec x + \\vec a} \\right) = 8{\/tex}<\/span>, Then find {tex}\\left| {\\vec x} \\right|{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            11. \n
              \n
              \n

              Find the position vector of the mid-point of the vector joining the points P (2, 3, 4) and Q(4,1, – 2)<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            12. \n
              \n
              \n

              Find sine of the angle between the vectors. {tex}\\vec a = 2\\hat i – \\hat j + 3\\hat k,\\vec b = \\hat i + 3\\hat j + 2\\hat k{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            13. \n
              \n
              \n

              Find the projection of the vector {tex}\\hat i + 3\\hat j + 7\\hat k{\/tex}<\/span> on the vector {tex}7\\hat i – \\hat j + 8\\hat k{\/tex}<\/span><\/p>\n<\/div>\n<\/div>\n<\/li>\n

            14. \n
              \n
              \n

              Let {tex} \\vec { a } = \\hat { i } + \\hat { j } + \\hat { k } , \\vec { b } = 4 \\hat { i } – 2 \\hat { j } + 3 \\hat { k }{\/tex}<\/span> and {tex} \\vec { c } = \\hat { i } – 2 \\hat { j } + \\hat { k }.{\/tex}<\/span>Find a vector of magnitude 6 units, which is parallel to the vector {tex} 2 \\vec { a } – \\vec { b } + 3 \\vec { c }.{\/tex}<\/span><\/p>\n<\/div>\n<\/div>\n<\/li>\n

            15. \n
              \n
              \n

              Let {tex}\\vec a = \\hat i + 4\\hat j + 2\\hat k,\\vec b = 3\\hat i – 2\\hat j + 7\\hat k{\/tex}<\/span> and {tex}\\vec c = 2\\hat i – \\hat j + 4\\hat k{\/tex}<\/span> .Find a vector {tex}\\vec d{\/tex}<\/span> which is perpendicular to both {tex}\\vec a{\/tex}<\/span> and {tex}\\vec b{\/tex}<\/span> and {tex}\\vec c.\\vec d = 15{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            16. \n
              \n
              \n

              A girl walks 4 km towards west, then she walks 3 km in a direction {tex}{30^0}{\/tex}<\/span> east of north and stops. Determine the girl\u2019s displacement from her initial point of departure.<\/p>\n<\/div>\n<\/div>\n<\/li>\n

            17. \n
              \n
              \n

              Find a vector {tex}\\vec d{\/tex}<\/span> which is {tex} \\bot {\/tex}<\/span> to both {tex}\\vec a{\/tex}<\/span> and {tex}\\vec b{\/tex}<\/span> and {tex}\\vec c{\/tex}<\/span>. {tex}\\vec d = 15{\/tex}<\/span> Let {tex}\\vec a = \\hat i + 4\\hat j + 2\\hat k,\\vec b = 3\\hat i – 2\\hat j + 7\\hat k{\/tex}<\/span> and {tex}\\vec c = 2\\hat i – \\hat j + 4\\hat k{\/tex}<\/span>.<\/p>\n<\/div>\n<\/div>\n<\/li>\n<\/ol>\n

              Chapter 10 Vector Algebra<\/strong><\/p>\n

              \n

              Solution<\/b><\/p>\n

                \n
              1. \n
                  \n
                1. {tex}\\frac{\\pi }{4}{\/tex}<\/span>,\u00a0Explanation:<\/strong> {tex}| {\\overrightarrow a } | = \\sqrt 3 ,| {\\overrightarrow b } | = 2,\\overrightarrow a .\\overrightarrow b = \\sqrt 6{\/tex}<\/span>
                  \n{tex}\\Rightarrow \\overrightarrow a .\\overrightarrow b = | {\\overrightarrow a } |.| {\\overrightarrow b } |\\cos \\theta \\Rightarrow \\sqrt 6{\/tex}<\/span>
                  \n{tex} = 2\\sqrt 3 \\cos \\theta{\/tex}<\/span>
                  \n{tex}\\Rightarrow \\cos \\theta = \\frac{1}{{\\sqrt 2 }} \\Rightarrow \\theta = \\frac{\\pi }{4} {\/tex}<\/span><\/li>\n<\/ol>\n
                    \n
                  1. {tex}{\\cos ^{ – 1}}\\left( {\\frac{5}{7}} \\right){\/tex}<\/span>,\u00a0Explanation:<\/strong> {tex}\\overrightarrow a = \\widehat i – 2\\widehat j + 3\\widehat k,\\overrightarrow b = 3\\widehat i – 2\\widehat j + \\widehat k {\/tex}<\/span>{tex}\\Rightarrow | {\\overrightarrow a } | = \\sqrt {14} , | {\\overrightarrow b } | = \\sqrt {14}, \\overrightarrow a .\\overrightarrow b = 10{\/tex}<\/span>
                    \n{tex} \\Rightarrow \\frac{{\\overrightarrow a .\\overrightarrow b }}{{| {\\overrightarrow a } || {\\overrightarrow b } |}} = \\cos \\theta \\Rightarrow \\frac{{10}}{{14}} = \\cos \\theta {\/tex}<\/span>
                    \n{tex}\\Rightarrow \\cos \\theta = \\frac{5}{7} \\Rightarrow \\theta = {\\cos ^{ – 1}}\\frac{5}{7} \\\\\\\\\\\\ {\/tex}<\/span><\/li>\n<\/ol>\n
                      \n
                    1. magnitude as well as direction,\u00a0Explanation:<\/strong> A vector has both magnitude as well as direction.<\/li>\n<\/ol>\n
                        \n
                      1. {tex} – 4\\hat j – \\hat k{\/tex}<\/span>,\u00a0Explanation:<\/strong> We have:\u00a0vectors <\/span>{tex}\\vec{a}=\\hat{i}-2\\hat{j}+\\hat{k},{\/tex}<\/span>\u00a0<\/span>{tex}\\vec{b}=-2\\hat{i}+4\\hat{j}+5\\hat{k}{\/tex}<\/span>\u00a0and\u00a0<\/span><\/li>\n<\/ol>\n
                          \n
                        1. {tex}\\frac{1}{{\\sqrt {14} }},\\;\\frac{2}{{\\sqrt {14} }},\\;\\frac{3}{{\\sqrt {14} }}{\/tex}<\/span>,\u00a0Explanation:<\/strong> Let\u00a0<\/span>{tex}\\overrightarrow a =\\hat i + 2\\hat j + 3\\hat k{\/tex}<\/span>,<\/span>Then,\u00a0{tex}\\widehat a = \\frac{{\\overrightarrow a }}{{\\left| {\\overrightarrow a } \\right|}} = \\frac{{\\widehat i + 2\\widehat j + 3\\widehat k}}{{\\sqrt {{1^2} + {2^2} + {3^2}} }} = \\frac{{\\widehat i + 2\\widehat j + 3\\widehat k}}{{\\sqrt {14} }}{\/tex}<\/span>
                          \nTherefore , the D.C.\u2019s of vector a are :
                          \n{tex}\\frac{1}{{\\sqrt {14} }},\\;\\frac{2}{{\\sqrt {14} }},\\;\\frac{3}{{\\sqrt {14} }}.{\/tex}<\/span><\/li>\n<\/ol>\n<\/li>\n
                        2. k\u00a0{tex}\\in{\/tex}<\/span>\u00a0]-1, 1 [k\u00a0{tex}\\ne{\/tex}<\/span>\u00a0{tex}-\\frac{1}{2}{\/tex}<\/span><\/li>\n
                        3. 0<\/li>\n
                        4. {tex}\\frac{\\pi}{3}{\/tex}<\/span><\/li>\n
                        5. {tex}\\vec a \\times \\vec b = \\left| {\\begin{array}{*{20}{c}} {\\hat i}&{\\hat j}&{\\hat k} \\\\ 2&1&3 \\\\ 3&5&{ – 2} \\end{array}} \\right|{\/tex}<\/span>
                          \n{tex}= \\hat i\\left( { – 2 – 15} \\right) – \\hat j\\left( { – 4 – 9} \\right) + \\hat k\\left( {10 – 3} \\right){\/tex}<\/span>
                          \n{tex} = – 17\\hat i + 13\\hat j + 7\\hat k{\/tex}<\/span><\/li>\n
                        6. We are given that, {tex}\\vec { a } \\cdot \\vec { b } = 8{\/tex}<\/span> and {tex}\\vec { b } = 2 \\hat { i } + 6 \\hat { j } + 3 \\hat { k }{\/tex}<\/span>
                          \n{tex}\\therefore{\/tex}<\/span> The projection of {tex} \\vec { a }{\/tex}<\/span> on {tex} \\vec { b }{\/tex}<\/span> is given as = {tex}\\frac { \\vec { a } \\cdot \\vec { b } } { | \\vec { b } | }{\/tex}<\/span>
                          \n{tex}= \\frac { 8 } { \\sqrt { 2 ^ { 2 } + 6 ^ { 2 } + 3 ^ { 2 } } }{\/tex}<\/span>
                          \n{tex}= \\frac { 8 } { \\sqrt { 4 + 36 + 9 } }{\/tex}<\/span>
                          \n{tex}= \\frac { 8 } { \\sqrt { 49 } } = \\frac { 8 } { 7 }{\/tex}<\/span><\/li>\n
                        7. {tex}\\left| {\\vec a} \\right| = 1{\/tex}<\/span>
                          \n{tex}\\left( {\\vec x – \\vec a} \\right).\\left( {\\vec x + \\vec a} \\right) = 8{\/tex}<\/span>
                          \n{tex}{\\left| {\\vec x} \\right|^2} -| \\vec a|^2= 8{\/tex}<\/span>
                          \n{tex}{\\left| {\\vec x} \\right|^2} -1= 8{\/tex}<\/span>
                          \n{tex}{\\left| {\\vec x} \\right|^2} = 9{\/tex}<\/span>
                          \n{tex}\\left| {\\vec x} \\right| = 3{\/tex}<\/span><\/li>\n
                        8. Given: Point P (2, 3, 4) and Q(4,1, – 2)
                          \n{tex}\\therefore{\/tex}<\/span> Position vector of point P is {tex}\\vec a = 2\\hat i + 3\\hat j + 4\\hat k{\/tex}<\/span>
                          \nAnd Position vector of point Q is {tex}\\vec b = 4\\hat i + \\hat j – 2\\hat k{\/tex}<\/span>
                          \nAnd Position vector of mid-point R of PQ is {tex}\\frac{{\\vec a + \\vec b}}{2} = \\frac{{2\\hat i + 3\\hat j + 4\\hat k + 4\\hat i + \\hat j – 2\\hat k}}{2}{\/tex}<\/span>
                          \n{tex}=\\frac{{6\\hat i + 4\\hat j + 2\\hat k}}{2} = 3\\hat i + 2\\hat j + \\hat k{\/tex}<\/span><\/li>\n
                        9. {tex}\\vec a \\times \\vec b = \\left| {\\begin{array}{*{20}{c}} {\\hat i}&{\\hat j}&{\\hat k} \\\\ 2&{ – 1}&3 \\\\ 1&3&2 \\end{array}} \\right|{\/tex}<\/span>
                          \n{tex}= – 11\\hat i – \\hat j + 7\\hat k{\/tex}<\/span>
                          \n{tex}\\left| {\\vec a \\times \\vec b} \\right| = \\sqrt {{{\\left( { – 11} \\right)}^2} + {{\\left( { – 1} \\right)}^2} + {{\\left( 7 \\right)}^2}} {\/tex}<\/span>
                          \n{tex} = \\sqrt {171} = 3\\sqrt {19} {\/tex}<\/span>
                          \n{tex}\\sin \\theta = \\frac{{\\left| {\\vec a \\times \\vec b} \\right|}}{{\\left| {\\vec a} \\right|\\left| {\\vec b} \\right|}} = \\frac{{3\\sqrt {19} }}{{\\sqrt {14} .\\sqrt {14} }} = \\frac{3}{{14}}\\sqrt {19}{\/tex}<\/span><\/li>\n
                        10. Let {tex}\\vec a = \\hat i + 3\\hat j + 7\\hat k{\/tex}<\/span> and {tex}\\vec b = 7\\hat i – \\hat j + 8\\hat k{\/tex}<\/span>
                          \nProjection of vector {tex}\\vec a{\/tex}<\/span> on {tex}\\vec b = \\frac{{\\vec a.\\vec b}}{{\\left| {\\vec b} \\right|}}{\/tex}<\/span>
                          \n{tex}= \\frac{{\\left( 1 \\right)\\left( 7 \\right) + \\left( 3 \\right)\\left( { – 1} \\right) + 7\\left( 8 \\right)}}{{\\sqrt {{{\\left( 7 \\right)}^2} + {{\\left( { – 1} \\right)}^2} + {{\\left( 8 \\right)}^2}} }}{\/tex}<\/span>
                          \n{tex}= \\frac{{7 – 3 + 56}}{{\\sqrt {49 + 61 + 64} }} = \\frac{{60}}{{\\sqrt {114} }}{\/tex}<\/span><\/li>\n
                        11. According to the question ,
                          \n{tex}\\vec { a } = \\hat { i } + \\hat {j} + \\hat { k } , {\/tex}<\/span>
                          \n{tex}\\vec { b } = 4 \\hat { i } – 2 \\hat { j } + 3 \\hat { k }{\/tex}<\/span> and
                          \n{tex} \\vec { c } = \\hat { i } – 2 \\hat { j } + \\hat { k }{\/tex}<\/span>
                          \nNow {tex},2 \\vec { a } – \\vec { b } + \\vec { 3 } \\vec { c }{\/tex}<\/span>
                          \n{tex} = 2 ( \\hat { i } + \\hat { j } + \\hat { k } ) – ( 4 \\hat { i } – 2 \\hat { j } + 3 \\hat { k } ) + 3 ( \\hat { i } – 2 \\hat { j}+ \\hat { k } ){\/tex}<\/span>
                          \n{tex} = 2 \\hat { i } + 2 \\hat { j } + 2 \\hat { k } – 4 \\hat { i } + 2 \\hat { j } – 3 \\hat { k } + 3 \\hat { i } – 6 \\hat { j } + 3{ \\hat { k } }{\/tex}<\/span>
                          \n{tex} = \\hat { i } – 2 \\hat {j } + { 2 } \\hat { k }{\/tex}<\/span>
                          \n{tex} \\Rightarrow \\quad 2 \\vec { a } – \\vec { b } + 3 \\vec { c } = \\hat { i } – 2 \\hat { j } + { 2 } \\hat { k }{\/tex}<\/span>
                          \nNow, a unit vector in the direction of vector is {tex} 2 \\vec { a } – \\vec { b } + 3 \\vec { c } = \\frac { 2 \\vec { a } – \\vec { b } + 3 \\vec { c } } { | 2 \\vec { a } – \\vec { b } + 3 \\vec { c } | }{\/tex}<\/span>
                          \n{tex} = \\frac { \\hat { i } – 2 \\hat { j } + 2 \\hat { k } } { \\sqrt { ( 1) ^ { 2 } + ( – 2 ) ^ { 2 } + ( 2 ) ^ { 2 } } }{\/tex}<\/span>
                          \n{tex} = \\frac { \\hat { i } – 2 \\hat { j } + 2 \\hat { k } } { \\sqrt { 9 } }{\/tex}<\/span>
                          \n{tex}= \\frac { \\hat { i } – 2 \\hat { j } + 2 \\hat { k } } { 3 }{\/tex}<\/span>
                          \n{tex} = \\frac { 1 } { 3 } \\hat { i } – \\frac { 2 } { 3 } \\hat { j } + \\frac { 2 } { 3 } \\hat { k }{\/tex}<\/span>
                          \nVector of magnitude 6 units parallel to the vector is ,
                          \n{tex} = 6 \\left( \\frac { 1 } { 3 } \\hat { i } – \\frac { 2 } { 3 } \\hat { j } + \\frac { 2 } { 3 } \\hat { k } \\right){\/tex}<\/span>
                          \n{tex} = 2 \\hat { i } – 4 \\hat { j } + 4 \\hat { k }{\/tex}<\/span><\/li>\n
                        12. Given: Vectors {tex}\\vec a = \\hat i + 4\\hat j + 2\\hat k{\/tex}<\/span> and {tex}\\vec b = 3\\hat i – 2\\hat j + 7\\hat k{\/tex}<\/span>
                          \nWe know that the cross-product of two vectors, {tex}\\vec a \\times \\vec b{\/tex}<\/span> is a vector perpendicular to both {tex}\\vec a{\/tex}<\/span> and {tex}\\vec b{\/tex}<\/span>
                          \nHence, vector {tex}\\vec d{\/tex}<\/span> which is also perpendicular to both {tex}\\vec a{\/tex}<\/span> and {tex}\\vec b{\/tex}<\/span> is {tex}\\vec d = \\lambda \\left( {\\vec a \\times \\vec b} \\right){\/tex}<\/span> where {tex}\\lambda = 1{\/tex}<\/span> or some other scalar.
                          \nTherefore, {tex}\\vec d = \\lambda \\left| {\\begin{array}{*{20}{c}} \\vec i&\\vec j&\\vec k \\\\ 1&4&2 \\\\ 3&{ – 2}&7 \\end{array}} \\right|{\/tex}<\/span>
                          \n{tex}= \\lambda \\left[ {\\hat i\\left( {28 + 4} \\right) – \\hat j\\left( {7 – 6} \\right) + \\hat k\\left( { – 2 – 12} \\right)} \\right]{\/tex}<\/span>
                          \n{tex} \\Rightarrow \\vec d = 32\\lambda \\hat i – \\lambda \\hat j – 14\\lambda \\hat k{\/tex}<\/span>…(i)
                          \nNow given {tex}\\vec c = 2\\hat i – \\hat j + 4\\hat k{\/tex}<\/span> and {tex}\\vec c.\\vec d = 15{\/tex}<\/span>
                          \n{tex}\\vec c.\\vec d = 15{\/tex}<\/span>
                          \n{tex}= 2\\left( {32\\lambda } \\right) + \\left( { – 1} \\right)\\left( { – \\lambda } \\right) + 4\\left( { – 14\\lambda } \\right) = 15{\/tex}<\/span>
                          \n{tex} \\Rightarrow 64\\lambda + \\lambda – 56\\lambda = 15{\/tex}<\/span>
                          \n{tex} \\Rightarrow 9\\lambda = 15{\/tex}<\/span>
                          \n{tex} \\Rightarrow \\lambda = \\frac{{15}}{9}{\/tex}<\/span>
                          \n{tex} \\Rightarrow \\lambda = \\frac{5}{3}{\/tex}<\/span>
                          \nPutting {tex}\\lambda = \\frac{5}{3}{\/tex}<\/span> in eq. (i), we get
                          \n{tex}\\vec d = \\frac{5}{3}\\left[ {32\\hat i – \\hat j – 14\\hat k} \\right]{\/tex}<\/span>
                          \n{tex}\\Rightarrow \\vec d = \\frac{1}{3}\\left[ {160\\hat i – 5\\hat j – 70\\hat k} \\right]{\/tex}<\/span><\/li>\n
                        13. Let the initial point of departure is origin (0, 0) and the girl walks a distance OA = 4 km towards west.
                          \nThrough the point A, draw a line AQ parallel to a line OP, which is {tex}{30^0}{\/tex}<\/span> East of North, i.e., in East-North quadrant making an angle of {tex}{30^0}{\/tex}<\/span> with North.
                          \nAgain, let the girl walks a distance AB = 3 km along this direction {tex}\\overrightarrow {OQ} {\/tex}<\/span>
                          \n{tex}\\therefore \\overrightarrow {OA} = 4\\left( { – \\vec i} \\right) = – 4\\hat i{\/tex}<\/span> \u2026(i) [{tex}\\because {\/tex}<\/span> Vector {tex}\\overrightarrow {OA} {\/tex}<\/span> is along OX\u2019]\n\"CBSE
                          \nNow, draw BM perpendicular to x – axis.
                          \nIn {tex}\\Delta AMB{\/tex}<\/span> by Triangle Law of Addition of vectors,
                          \n{tex}\\overrightarrow {AB} = \\overrightarrow {AM} + \\overrightarrow {MB} = \\left( {AM} \\right)\\hat i + \\left( {MB} \\right)\\hat i{\/tex}<\/span>
                          \nDividing and multiplying by AB in R.H.S.,
                          \n{tex}\\overrightarrow {AB} = AB\\frac{{AM}}{{AB}}\\hat i + AB\\frac{{MB}}{{AB}}\\hat j {\/tex}<\/span> {tex}= 3\\cos {60^o}\\hat i + 3\\sin {60^o}\\hat j{\/tex}<\/span>
                          \n{tex}\\Rightarrow AB = 3\\frac{1}{2}\\hat i + 3\\frac{{\\sqrt 3 }}{2}\\hat i = \\frac{3}{2}\\hat i + \\frac{{3\\sqrt 3 }}{2}j{\/tex}<\/span> \u2026(ii)
                          \n{tex}\\therefore{\/tex}<\/span> Girl\u2019s displacement from her initial point O of departure to final point B,
                          \n{tex}\\overrightarrow {OB} = \\overrightarrow {OA} + \\overrightarrow {AB} {\/tex}<\/span> {tex}= – 4\\hat i + \\left( {\\frac{3}{2}\\hat i + \\frac{{3\\sqrt 2 }}{2}\\hat j} \\right) {\/tex}<\/span> {tex}= \\left( { – 4 + \\frac{3}{2}} \\right)\\hat i + \\frac{{3\\sqrt 3 }}{2}\\hat j{\/tex}<\/span>
                          \n{tex}\\Rightarrow \\overrightarrow {OB} = \\frac{{ – 5}}{2}\\hat i + \\frac{{3\\sqrt 3 }}{2}\\hat j{\/tex}<\/span><\/li>\n
                        14. {tex}\\vec a = \\hat i + 4\\hat j + 2\\hat k,\\vec b = 3\\hat i – 2\\hat j + 7\\hat k{\/tex}<\/span> and {tex}\\vec c = 2\\hat i – \\hat j + 4\\hat k{\/tex}<\/span>
                          \nLet {tex}\\vec d = x\\hat i + y\\hat j + z\\hat k{\/tex}<\/span>
                          \nATQ, {tex}\\vec d.\\vec a = 0,\\vec d.\\vec b = 0{\/tex}<\/span> and {tex}\\vec c.\\vec d = 15{\/tex}<\/span>, then,
                          \nx + 4y + 2z = 0 …(1)
                          \n3x – 2y + 7z = 0 …(2)
                          \n2x – y + 4z = 15 …(3)
                          \nOn solving equation (1) and (2)
                          \n\"CBSE
                          \n{tex}\\frac{x}{{28 + 4}} = \\frac{y}{{6 – 7}} = \\frac{z}{{ – 2 – 12}} = k{\/tex}<\/span>
                          \nx = 32k, y = -k, z = -14k
                          \nPut x, y, z in equation (3)
                          \n2(32k) – (-k) + 4(-14k) = 15
                          \n64k + k – 56k = 15
                          \n9k = 15
                          \n{tex}k = \\frac{{15}}{9}{\/tex}<\/span>
                          \n{tex}k = \\frac{5}{3}{\/tex}<\/span>
                          \n{tex}x = 32 \\times \\frac{5}{3} = \\frac{{160}}{3}{\/tex}<\/span>
                          \n{tex}y = – \\frac{5}{3} {\/tex}<\/span>
                          \n{tex}z = – 14 \\times \\frac{5}{3} = – \\frac{{70}}{3}{\/tex}<\/span>
                          \n{tex}\\vec d = \\frac{{160}}{3}\\hat i – \\frac{5}{3}\\hat j – \\frac{{70}}{3}\\hat k{\/tex}<\/span><\/li>\n<\/ol>\n

                          Chapter Wise Important Questions Class 12 Maths Part I and Part II<\/h2>\n
                            \n
                          1. Relations and Functions<\/a><\/li>\n
                          2. Inverse Trigonometric Functions<\/a><\/li>\n
                          3. Matrices<\/a><\/li>\n
                          4. Determinants<\/a><\/li>\n
                          5. Continuity and Differentiability<\/a><\/li>\n
                          6. Application of Derivatives<\/a><\/li>\n
                          7. Integrals<\/a><\/li>\n
                          8. Application of Integrals<\/a><\/li>\n
                          9. Differential Equations<\/a><\/li>\n
                          10. Vector Algebra<\/a><\/li>\n
                          11. Three Dimensional Geometry<\/a><\/li>\n
                          12. Linear Programming<\/a><\/li>\n
                          13. Probability<\/a><\/li>\n<\/ol>\n","protected":false},"excerpt":{"rendered":"

                            CBSE Class 12 Mathematics Vector Algebra Extra Questions. myCBSEguide has just released Chapter Wise Question Answers for class 12 Maths. There chapter wise Practice Questions with complete solutions are available for download in\u00a0myCBSEguide\u00a0website and mobile app. These Questions with solution are prepared by our team of expert teachers who are teaching grade in CBSE schools … Read more<\/a><\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[1346,1432],"tags":[1867,1839,1838,1833,1832,1854],"class_list":["post-27931","post","type-post","status-publish","format-standard","hentry","category-cbse","category-mathematics-cbse-class-12","tag-cbse-class-12-mathematics","tag-extra-questions","tag-important-questions","tag-latest-exam-questions","tag-practice-questions","tag-practice-test"],"yoast_head":"\nCBSE Class 12 Mathematics Vector Algebra Extra Questions<\/title>\n<meta name=\"description\" content=\"CBSE Class 12 Mathematics Vector Algebra Extra Questions myCBSEguide has 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