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Show that: |A⃗ + B⃗ |² - |A⃗ - B⃗ |² = 4 A⃗.B⃗ .​
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Show that: |A⃗ + B⃗ |² - |A⃗ - B⃗ |² = 4 A⃗.B⃗ .​

Show that: |A⃗ + B⃗ |² - |A⃗ - B⃗ |² = 4 A⃗.B⃗ .​-example-1
User Jonas Lundman
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19 votes

Given Question:-

Prove that :


\sf \: { |\vec{A} + \vec{B}| }^(2) - { |\vec{A} - \vec{B}| }^(2) = 4 \: \vec{A} \: . \: \vec{B}


\green{\large\underline{\sf{Solution-}}}

Consider, LHS


\rm :\longmapsto\: { |\vec{A} + \vec{B}| }^(2) - { |\vec{A} - \vec{B}| }^(2)

We know,


\rm :\longmapsto\:\boxed{\tt{ |\vec{x}| ^(2) = \vec{x}.\vec{x}}}

So, using this, we get


\rm \:  =  \: (\vec{A} + \vec{B}).(\vec{A} + \vec{B}) - (\vec{A} - \vec{B}).(\vec{A} - \vec{B})


\rm \:  =  \:[ \vec{A}.\vec{A} + \vec{A}.\vec{B} + \vec{B}.\vec{A} + \vec{B}.\vec{B}] - [\vec{A}.\vec{A} - \vec{A}.\vec{B} - \vec{B}.\vec{A} + \vec{B}.\vec{B}]


\rm \:  =  \: [ { |\vec{A}| }^(2) + \vec{A}.\vec{B} + \vec{A}.\vec{B} + { |\vec{B}| }^(2)] - [ { |\vec{A}| }^(2) - \vec{A}.\vec{B} - \vec{A}.\vec{B} + { |\vec{B}| }^(2)]


\red{ \bigg\{  \sf \: \because \: \vec{A}.\vec{B} = \vec{B}.\vec{A} \bigg\}}


\rm \:  =  \: [ { |\vec{A}| }^(2) + 2\vec{A}.\vec{B} + { |\vec{B}| }^(2)] - [ { |\vec{A}| }^(2) -2 \vec{A}.\vec{B} + { |\vec{B}| }^(2)]


\rm \:  =  \: { |\vec{A}| }^(2) + 2\vec{A}.\vec{B} + { |\vec{B}| }^(2)- [{ |\vec{A}| }^(2) + 2 \vec{A}.\vec{B} - { |\vec{B}| }^(2)


\rm \:  =  \: 4 \: \vec{A}.\vec{B}

Hence,


\sf \:\boxed{\tt{ \: \: { |\vec{A} + \vec{B}| }^(2) - { |\vec{A} - \vec{B}| }^(2) = 4 \: \vec{A} \: . \: \vec{B} \: \: }}

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Additional Information


\boxed{\tt{ \vec{A}.\vec{B} = \vec{B}.\vec{A}}}


\boxed{\tt{ \vec{A}.\vec{A} = { |\vec{A}| }^(2) }}


\boxed{\tt{ \vec{A} * \vec{B} = - \vec{B} * \vec{A}}}


\boxed{\tt{ \vec{A} * \vec{A} = 0}}


\boxed{\tt{ \vec{A}.\vec{B} = 0 \: \rm\implies \:\vec{A} \: \perp \: \vec{B}}}


\boxed{\tt{ \vec{A} * \vec{B} = 0 \: \rm\implies \:\vec{A} \: \parallel \: \vec{B}}}

User Inki
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