Tangent Line Problems

Tangent Line Problems • Find the equations of tangents at given points • Find the points on the curve if tangent slope is known • Find equations of tangents parallel to given lines through a given point. • Find equations of tangents perpendicular to given lines through a given point. • Find equations of tangents to curves at their point of intersection.

Point of tangency is f (–1) = (–1)2+ 2(–1) – 3= – 4 → (– 1, – 4) (–1, –4) Tangent Line Problems Example 1: Find the equation of the tangent to f (x) = x 2 + 2x – 3 at x = –1 Solution Slope of tangent = f ' (x) = 2x + 2 Slope of tangentat x = –1→ f ' (–1) = 2(–1)+ 2 = 0 – 4 = 0(–1) + b b = – 4 y= – 4

Example 2: Find the equation of the tangent to f (x) = ½ x 4 + x – 2 at x = – 2 (– 2 , 4) Solution Point of tangency is f (–2) = 4 → (–2, 4) Slope of tangentf ' (x) = 4( ½) x4 – 1 + 1(1)x 1 – 1 – 0 f ' (x) = 2x3 + 1 Slope of tangentat x = –2→ f '(–2) = 2(–2)3+ 1 = –15 –4 = –15(–2) + b b = –26 y=–15x –26

Example 3: Find the points where the graph off(x) = x3 + 2x2 – 5x + 1 has tangent lines with a slope of 2. f'(x) = 3x2 + 4x – 5 Solution Derivative of the function gives the slope of the tangent lines 3x2 + 4x – 5 = 2 3x2 + 4x – 7 = 0 (3x + 7)(x – 1) = 0 x = • or x = 1 The points on the graph off (x)where the slope willbe 2 areand (1, – 1)

(1, -1) Check by graphing

Example 4 Given the curve g(x) = x3 – 12 x, at what points is the slope of the tangent line equal to 15? g(x) = x3 – 12 x g' (x) = 3x2 – 12 3x2 – 12 = 15 or 3x2 – 27 = 0 3x2 = 27 3(x2 – 9) = 0 x2 = 9 3(x – 3)(x + 3) = 0 x = 3 or – 3 Points are (3, –9) and (–3, 9)

y = 15x + 54 m = 15 y = 15x – 54 m = 15 (-3, 9) (3, -9)

Example 5: Find the equation of a tangent to the graph of f (x) = – 2x 2that is paralleltoy = – 4x – 5 (1, -2) Solution:The derivative of any function determines the slope of the tangent line f' (x ) = – 4x and the slope of the given line is – 4 – 4 x =– 4 x = 1 f (x) = – 2x 2→ f (1) = – 2(1)2 = – 2 m = – 4 and P(1, – 2) – 2 = – 4(1) + b b = 2 y = – 4 x + 2 y = 2x2 y = – 4x – 5

Example 6 Find the equation of a tangent to the graph of f (x) = 3x2 – 4 that is perpendicularto Solution:The derivative of any function determines the slope of the tangent line f' (x ) = 6xand the slope of the given line is so the slope of the perpendicular line is6 6x = 6 x =1 f (x) = 3x 2– 4→ f (1) = 3(1)2 – 4 = – 1 m = 6 and P(1, – 1) – 1 = 6(1) + b b = – 7 y = 6 x – 7

Example 6 Continued Graph and check. y = 6x – 7 y = 3x2 – 4

Example 7 Find the equation of the tangents to the curves and at their point of intersection Solution: Graphs intersect when x3 = 27 x = 3 Point of intersection is (3, 3)

Example 7 Continued • Equations of Tangents • 3 = 2(3) + b 3 = – 1(3) + b • b = – 3 b = 6 • y = 2x – 3y = – x + 6

(3, 3) Graph and Check y = -x + 6 y = 2x – 3

Lesson 3 Tangent Problems Assignment Complete Questions 1-14 Hand-in for marks

Tangent Line Problems