Write the equation of the line
Through the given point. Use slope intercept form.

In order to find this, we first need to start with the slope. Perpendicular lines have opposite and reciprocal slopes. Therefore, to be perpendicular to a line with a -6/5 slope, our new line would need to have a 5/6 slope.

Next we use that along with the given point in slope intercept form to find the intercept.

y = mx + b

1 = 5/6(-9) + b

1 = -15/2 + b

17/2 = b

Now that we have the slope and the intercept, we can write the equation.

y = 5/6x + 17/2

kudzordzifrancis kudzordzifrancis · Answer 2 · 2018-09-20T16:04:18+02:00

kudzordzifrancis kudzordzifrancis

20-09-2018

The slope of the given line = (-1/(-6/5)) = 5/6 It passes through; (-9,1) Using the slope intercept form; y - y1 =m(x-x2) y-1=5/6(x--9) » y -1 = 5/6(x+9) Multiplying through by 6 gives 5y-5 = 5(x+9) Expanding brackets we have; 6y-6 = 5x+45 6y-5x-51= 0 is the required equation.

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Write the equation of the line Through the given point. Use slope intercept form.

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Write the equation of the line
Through the given point. Use slope intercept form.