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MathematicsVectorDot Product & Its Application ( Projection etc.)Easy2 minPYQ_2023
MathematicsEasysingle choice

Letα=4i^+3j^+5k^andβ=i^+2j^-4k^. Letβ1be parallel toαandβ2be perpendicular toα. Ifβ=β1+β2, then the value of5β2·i^+j^+k^is

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Answer:
C
Solution:

Given that α=4i^+3j^+5k^ and β=i^+2j^-4k^ and β=β1+β2

β2=β-β1 ..........1

since β1 is parallel to αβ1=tα

β1=t4i^+3j^+5k^=4ti^+3tj^+5tk^ .........2

Substituting the values of β1 and α in (1), we get

β2=i^+2j^-4k^-4ti^+3tj^+5tk^=1-4ti^+2-3tj^+-4-5tk^ ............3

since β2 is perpendicular to α, so β2·α=0

1-4ti^+2-3tj^+-4-5tk^ ·4i^+3j^+5k^=0

41-4t+32-3t+5-4-5t=0

4-16t+6-9t-20-25t=0

-50t=10t=-15

From 2 and 3, we get  β1=-154i^+3j^+5k^

β2=95i^+135j^-3k^=159i^+13j^-15k^

So, the value of 5β2·i^+j^+k^ will be,

=5×15(9i^+13j^-15k^)·i^+j^+k^=9+13-15=7

Stream:JEESubject:MathematicsTopic:VectorSubtopic:Dot Product & Its Application ( Projection etc.)
2mℹ️ Source: PYQ_2023

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