Let `veca=(1,1,-1), vecb=(5,-3,-3)` and `vecc=(3,-1,2)`. If `vecr` is collinear with `vecc` and has length `(|veca+vecb|)/(2)`, then `vecr` equalsA. `+-3c`B. `+-(3)/(2)c`C. `+-c`D. `+-(2)/(3)c`

Let `veca=(1,1,-1), vecb=(5,-3,-3)` and `vecc=(3,-1,2)`. If `vecr` is

1.	Let `veca=(1,1,-1), vecb=(5,-3,-3)` and `vecc=(3,-1,2)`. If `vecr` is collinear with `vecc` and has length `(\|veca+vecb\|)/(2)`, then `vecr` equalsA. `+-3c`B. `+-(3)/(2)c`C. `+-c`D. `+-(2)/(3)c`
Answer» Correct Answer - C let `r=lamdac` Given `\|r\|=\|lamda\|\|c\|` `therefore(\|a+c\|)/(2)=\|lamda\|\|c\|` `therefore\|6hati-2hatj-4hatk\|=2\|lamda\|3hati-hatj+2hatk\|` `therefore sqrt(56)=2\|lamda\|sqrt(14)` `therefore lamda=+-1` `therefore r=+-c`.

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Let `veca=(1,1,-1), vecb=(5,-3,-3)` and `vecc=(3,-1,2)`. If `vecr` is collinear with `vecc` and has length `(|veca+vecb|)/(2)`, then `vecr` equalsA. `+-3c`B. `+-(3)/(2)c`C. `+-c`D. `+-(2)/(3)c`

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