Download presentation
Presentation is loading. Please wait.
Published byKerry Porter Modified over 9 years ago
1
Curve Sketching Learning Outcomes Make tables and draw the graphs of various equations to include: Linear Functions Quadratic Functions Cubic Functions Exponential Functions Reciprocal Functions Trig Functions
2
Match the correct equations with the correct graph Solve equations graphically Interpret the effect of transformation on functions to include: y=f(x+a) applied to f(x) y=f(ax) applied to f(x) y=f(x)+a applied to f(x) y=af(x) applied to f(x)
3
Curve Sketching Linear Graphs Linear means y = m x + c where m = gradient c = intercept ( y axis) *NB coefficient of y must be 1 (0, -2) (-0.5, 0) y = -4 x – 2 y = 3 x + 2 (2, 0) (- 2 / 3, 0)
4
Curve Sketching Trig Graphs y = sin x y = cos x y = tan x
5
Curve Sketching Quadratic and Cubic Graphs Quadratic: y = a x 2 + b x + c General shape for a ≥ 0 General shape for a ≤ 0 Cubic: y = a x 3 + b x 2 + c x + d General shape for a ≥ 0 General shape for a ≤ 0
6
Curve Sketching Reciprocal and Exponential Graphs Reciprocal curves: y = 1 / x Exponential curves: y = 2 x (a x )
7
Curve Sketching Curve transformations Translate along x axis – using y = x 2 i)Draw y = ( x + 1) 2 - translation 1 to the left ii)Draw y = ( x - 1) 2 - translation 1 to the right Translate along y axis – using y = x 2 i)Draw y = x 2 + 1 - translation 1 upwards ii)Draw y = x 2 - 1 - translation 1 downwards
8
Curve Sketching Curve transformations Stretch along y axis – using y = sin x sin x i)Draw y = sin 2 x ii)Draw y = sin x /2
9
Curve Sketching Curve transformations Stretch along y axis y = f(x) → y = af(x) i)Draw y = cos x ii)Draw y = 2cos x i)Draw y = 2 x 2 ii)Draw y = ½ x 2
10
Curve Sketching Summary TypeNotationExampleEffect Translation i) Along x axis y = F( x + a) y = sin ( x + 90) Sine wave moves 90 ° to the left ii) Along y axis y = F( x ) + a y = x 3 -1 x 3 moves 1 unit down OY Stretch i) Along x axis y = F(a x ) y = sin 2 x Compression To make 2 sine waves ii) Along y axis y = aF( x ) y = 3cos x Stretch scale factor = 3
11
Curve Sketching Additional Notes
13
Curve Sketching Learning Outcomes: At the end of the topic I will be able to Can Revise Do Further Make tables and draw the graphs of various equations to include: Linear Functions Quadratic Functions Cubic Functions Exponential Functions Reciprocal Functions Trig Functions
14
Match the correct equations with the correct graph Solve equations graphically Interpret the effect of transformation on functions to include: y=f(x+a) applied to f(x) y=f(ax) applied to f(x) y=f(x)+a applied to f(x) y=af(x) applied to f(x)
Similar presentations
© 2024 SlidePlayer.com Inc.
All rights reserved.