# Let u = <3, -1>, v = <-6, -6>. Find 9u + 2v.

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Find similar answersMathematics, added 2021-11-26 20:32:25

Find a1 and d for an arithmetic sequence with these terms. a3=-8 and a7=32 ...

Mathematics, added 2021-11-26 19:21:16

Find a1 and d for an arithmetic sequence with these terms. a3=-8 and a7=32 ...

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Luv2Teach9u means you're multiplying 9 into that vector, both components. Same with the 2v. 9*3 = 27 and 9*-1 = -9, so your new vector u is <27, -9>. Now let's do v. 2* -6 (twice) = -12, so your new v vector is <-12, -12>. Add those together now, first components of each and second components of each. 27 + (-12) = 15; -9+(-12)=-21. So the addition of those gives us a final vector with a displacement of <15, -21>