Final Answer:
The equations of the tangent lines to y = (x-1)/(x+1) that are parallel to x - 2y = 5 are:
2y = x - 1
2y = x + 7
Step-by-step explanation:
Parallel Lines: Parallel lines have equal slopes. To find the slope of the tangent lines, we need to differentiate the given curve y = (x-1)/(x+1).
Differentiating the Curve: Using the quotient rule, we get:
y' = (2(x+1) - 2(x-1)) / (x+1)^2 = 2 / (x+1)^2
Matching Slopes: Since the parallel lines share the same slope as x - 2y = 5, we need to equate their slopes. Re-arranging x - 2y = 5 to isolate y, we get:
2y = x - 5
Therefore, the slope of both tangent lines is 2.
Specific Tangent Lines: With the common slope of 2, we need to find the specific x-coordinates where the tangent lines touch the curve. These points will serve as the y-intercepts for the tangent line equations.
Tangential Point 1: Let's assume one tangent line touches the curve at x = a. Substituting this into y = (x-1)/(x+1) and equating it to 2 (slope), we get:
2 = (a-1)/(a+1)
Solving for a, we find a = 3. This gives us the first tangent point at (3, 2/4) = (3, 1/2).
Tangential Point 2: Similarly, assume another tangent line touches the curve at x = b. Solving the same equation as before, we get b = -7. This gives us the second tangent point at (-7, -2/4) = (-7, -1/2).
Tangent Line Equations: Finally, using the point-slope form of linear equations with the respective slopes and points, we get the tangent line equations:
2y = x - 1 (passes through (3, 1/2))
2y = x + 7 (passes through (-7, -1/2))
Therefore, these two equations represent the tangent lines to the curve y = (x-1)/(x+1) that are parallel to the line x - 2y = 5.