Page 136 - Cambridge Checkpoint Mathematics Coursebook 7_Slide 02
P. 136
13.3 Other straight lines
6 a Complete this table of values for y = 2(x + 1).
x −4 −2 0 2 5
y −6
b Draw the graph of y = 2(x + 1).
7 a Complete this table of values for y = 3 − 2x.
x −2 −1 0 1 2 4
y 7 −1
b Draw the graph of y = 3 − 2x.
8 a Complete this table of values for y = 2x − 4.
Choose your own values of x between −3 and 5.
x −3 5
y 6
b Draw the graph of y = 2x − 4.
c Where does the graph cross each of the axes?
9 a Draw the graph of y = 6 − x with values of x from −2 to 7.
b On the same axes draw the graph of y = 2.
c Where do the two lines cross?
Summary
You should now know that: You should be able to:
★ ★ The x-axis is horizontal and the y-axis is vertical. ★ ★ Read and plot positive and negative coordinates
★ ★ The first coordinate is the x-coordinate and of points determined by geometric information.
the second coordinate is the y-coordinate. ★ ★ Recognise straight-line graphs parallel to the
Coordinates can be positive, negative or zero. x-axis and y-axis.
★ ★ Straight lines on a coordinate grid have ★ ★ Generate coordinate pairs that satisfy a linear
equations. equation, where y is given explicitly in terms of x,
★ ★ Lines with equations of the type x = 2 or y = –3 are and plot the corresponding graphs.
parallel to the y-axis or x-axis respectively. ★ ★ Draw accurate mathematical graphs.
★ ★ An equation such as y = 2x – 3 can be used to ★ ★ Recognise mathematical properties, patterns and
work out coordinates and draw a straight-line relationships, generalising in simple cases.
graph.
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134 13 Graphs
