Question

How do you find the equations of the tangent to the curve `y=x^2 + 2x -3` pass through the point (0,-7)?

Answer 1

The two equations are

`y = 6x - 7`
`y = -2x - 7`

Explanation:

The derivative is

`y = 2x + 2`

The slope will be given by `m= 2(a) + 2`. The point will be `(a, a^2 + 2a - 3)`.

`y - y_1 = m(x- x_1)`

`y - (a^2 + 2a - 3) = (2a + 2)(x - a)`

We can replace `(x, y)` with our point `(0, -7)`.

`-7 - a^2 -2a + 3 = (2a + 2)(0 - a)`

`-7 - a^2 - 2a + 3 = -2a^2 - 2a`

`a^2 - 4 = 0`

`(a + 2)(a - 2) = 0`

`a = 2 and -2`

Now use this to compute the actual equation.

For when `a = 2`

We have `m = 2(2) + 2 = 6` and the point will be `(2, 5)`.

Therefore, the equation is

`y - y_1 = m(x - x_1)`

`y - 5 = 6(x - 2)`

`y - 5 = 6x - 12`

`y = 6x - 7`

For when `a = -2`

We have `m = 2(-2) + 2 = -2` and the point will be `(-2, -3)`.

Therefore, the equation is

`y - y_1 = m(x- x_1)`

`y - (-3) = -2(x - (-2))`

`y + 3 = -2(x + 2)`

`y + 3 = -2x - 4`

`y = -2x - 7`

Hopefully this helps!