Two cars are traveling on two different roads that are perpendicular to each other. On a coordinate map, the first car started from the point (-5,-8) and stopped at (2,7). The second car started at (-5,1) and stopped at (10,y).

The y-coordinate of the second car is ______?

slope of first road[tex]m_{1} =\frac{7+8}{2+5} =\frac{15}{7} \\slope~of~second~road~m_{2}=\frac{y-1}{10+5} =\frac{y-1}{15} \\as~roads~are~perpendicular.\\

m_{1}*m_{2}=\frac{15}{7} *\frac{y-1}{15} =-1\\

or~y-1=-7\\y=-7+1=-6[/tex]

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JeanaShupp JeanaShupp · Answer 2 · 2019-10-15T14:20:24+02:00

Answer: The y-coordinate of the second car is -6.

Step-by-step explanation:

Given : Two cars are traveling on two different roads that are perpendicular to each other.

Slope of first car started from the point (-5,-8) and stopped at (2,7):

[tex]m_1=\dfrac{7-(-8)}{2-(-5)}=\dfrac{7+8}{2+5}=\dfrac{15}{7}[/tex]

Slope of second car started at (-5,1) and stopped at (10,y) :

[tex]m_2=\dfrac{y-1}{10-(-5)}=\dfrac{y-1}{10+5}=\dfrac{y-1}{15}[/tex]

Since both cars perpendicular, then the product of their slope is equals to -1.

[tex]m_1\times m_2=-1\\\\\Rightarrow\ \dfrac{15}{7}\times\dfrac{y-1}{15}=-1\\\\\Rightarrow\ y-1=-7\\\\\Rightarrow\ \ y=-7+1=-6[/tex]

Hence, The y-coordinate of the second car is -6.

Two cars are traveling on two different roads that are perpendicular to each other. On a coordinate map, the first car started from the point (-5,-8) and stopped at (2,7). The second car started at (-5,1) and stopped at (10,y). The y-coordinate of the second car is ______?

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Two cars are traveling on two different roads that are perpendicular to each other. On a coordinate map, the first car started from the point (-5,-8) and stopped at (2,7). The second car started at (-5,1) and stopped at (10,y).

The y-coordinate of the second car is ______?