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Javed Rege
Asked: 2022-11-07T06:57:45+05:30 In:

Let `vec(C )= vec(A)+vec(B)` then
A. `|vec(C )|` is always greater then `|vec(A)|`
B. It is possible to have `|vec(C )|lt|vec(A)| and |vec(C )lt|vec(B)|`
C. `C` is always equal to `A+B`
D. `C` is never equal to `A+B`

Let `vec(C )= vec(A)+vec(B)` then
A. `|vec(C )|` is always greater then `|vec(A)|`
B. It is possible to have `|vec(C )|lt|vec(A)| and |vec(C )lt|vec(B)|`
C. `C` is always equal to `A+B`
D. `C` is never equal to `A+B`
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1 Answer

  1. Correct Answer – B
    `vec(C )+vec(A)= vec(B)`
    The value of `C` lies between `A-B` and `A+B`
    `:. |vec(C )|lt|vec(A)| or |vec(C )|lt|vec(B)|`

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