Answer to Question #106709 in Analytic Geometry for Chris K.

Question #106709

Find the unit U(A) of a vector A = -20I + 36J. Given a vector A, U(A) is defined as A/|A|

Expert's answer

Given, A = -20I +36J

$|A|= \sqrt{(-20)^2 + (36)^2}= \sqrt{1696}=4\sqrt{106}$

$U(A) = \frac{A}{|A|} = \frac{-20I+36J}{4\sqrt{106}}=\frac{4(-5I+9J)}{4\sqrt{106}}=\frac{-5I+9J}{\sqrt{106}}$

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