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Find k so that a and b will be orthogonal

Find k so that a and b will be orthogonal-example-1
User Mle
by
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1 Answer

13 votes
13 votes

Answer:

k = -5

Explanation:

The scalar product of vectors a and b is zero when the vectors are orthogonal (perpendicular):


\boxed{\begin{aligned}\vec a \cdot \vec b & = |a||b| \cos \theta\\& = |a||b| \cos 90^(\circ)\\& = 0 \end{aligned}}


\textsf{Therefore, $\vec a$\; and \;$\vec b$\; are orthogonal when\; $\vec a\cdot \vec b=0$}

Given:

  • a = ⟨2, -2⟩
  • b = ⟨−5, k⟩

Substitute the given vectors into the formula and solve for k:


\implies \langle 2, -2 \rangle \cdot \langle-5, k \rangle=0


\implies (2)(-5) +(-2)(k)=0


\implies -10-2k=0


\implies 2k=-10


\implies k=-5

User Tiho
by
3.1k points