Let `vec(C )= vec(A)+vec(B)` then
A. `|vec(C )|` is always greater than `|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`
A. `|vec(C )|` is always greater than `|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`
Correct Answer – B