SOLUTION: Write the point-slope form of the equation of the line described.
through: (2, -5), parallel to y = - 5/2x + 2
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Linear-equations
-> SOLUTION: Write the point-slope form of the equation of the line described.
through: (2, -5), parallel to y = - 5/2x + 2
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Since any two parallel lines have the same slope we know the slope of the unknown line is (its from the slope of which is also ).
Also since the unknown line goes through (2,-5), we can find the equation by plugging in this info into the point-slope formula
Point-Slope Formula:
where m is the slope and (,) is the given point
Plug in , , and
Distribute
Multiply
Subtract from both sides to isolate y
Make into equivalent fractions with equal denominators
Combine the fractions
Reduce any fractions
So the equation of the line that is parallel to and goes through (,) is
So here are the graphs of the equations and
graph of the given equation (red) and graph of the line (green) that is parallel to the given graph and goes through (,)
The equation of the given line is written in slope-intercept form. Hence, you can determine the slope by inspection. Parallel lines have identical slopes. Use the Point-Slope form:
where are the coordinates of the given point and is the given slope.
John
My calculator said it, I believe it, that settles it
