Answer:
d = 1.847
Explanation:
To avoid any ambiguity, please enclose the slope -3/2 inside parentheses:
y = (-3/2)x + 1. Next, solve the 2nd equation for y: 2y = - 3x + 10 => y = (-3/2)x + 5. Notice how these two lines have the same slope (-3/2)? Thus, the two given lines are parallel.
It's important to realize that the distance between these two lines is a line segment with perpendicular to both lines. Thus, the segment representing this distance has the form y = (2/3)x + c. Let's say that this segment passes through the y-intercept of y = (-3/2)x + 1; it thus passes through (0,1), and thus has the equation y = (2/3)x + 1.
Find the point at which this y = (2/3)x + 1 intersects the line y = (3/2)x + 5. Note that the xresultant point
Setting these two equations = to one another results in (2/3)x + 1 = (-3/2)x + 5.
Multiplying both sides by the LCD (6) will eliminate the fractions:
4x + 6 = -9x + 30. Combining like terms: 13x = 24, and x = 24/13 = 1.846.
Substitute this x-value into y = (2/3)x + 1 to find the y-coordinate of the point of intersection of y = (2/3)x + 1 and y = (-3/2)x + 5:
When x = 1.846, y = (2/3)(1.846) + 1 = 1.231.
Thus, the desired distance is that between (0,1) and (1.846, 1.231), and is:
d = √ [ (1.846 - 0)^2 + (1.231 - 1)^2 ] = √ [ (1.846)^2 + (0.053)^2 ]
This simplifies to d = √ [ 3.408 + 0.003 ] = √3.411, or
d = 1.847 (answer)