Key points
Graphs of two or more straight lines can be used to solve simultaneous linear equations.
The graph of a straight line can be described using an equationA mathematical statement showing that two expressions are equal. The expressions are linked with the symbol =.
- horizontalThe right-left direction on a graph or map. Parallel to the horizon. lines are written as \(y = c\)
- verticalThe up-down direction on a graph or map. lines are written as \(x = c\)
- oblique lineA line that is slanted, neither horizontal nor vertical. are written as \(y = mx + c\)
\(m\) is a number which is a measure of the steepness of the line. This is the gradientA measure of the slope of a line. The steeper the line, the greater the gradient. The gradient is represented by 饾拵 in the equation 饾挌 = 饾拵饾挋 + 饾拕.
\(c\) is the number where the line crosses the \(y\)-axis. This is the \(y\)饾挌-颈苍迟别谤肠别辫迟The point at which the line crosses the 饾挌-axis. Commonly referred to as 'the intercept'..
The coordinateThe ordered pair of numbers (饾挋, 饾挌) that defines the position of a point. of the points on an oblique line are calculated by substituteIn algebra substitute means to replace a letter (or variable) with a number. given values of \(x\) into the equation \(y = mx + c\)
Recognise and draw the lines 饾挌 = 饾挋 and 饾挌 = -饾挋
All the points on the line \(y = x\) have coordinates with equal values for \(x\) and \(y\)
- To draw the line \(y = x\):
- Plot points with coordinates where \(x\) and \(y\) are equal. Three points are sufficient, but more can be plotted.
- Draw a line through the plotted points.
All the points on the line \(y = -x\) have coordinates with values for \(x\) and \(y\) that are equal in magnitudeSize. but with opposite signs.
If \(x\) is positive, \(y\) is negative. If \(x\) is negative, \(y\) is positive.
- To draw the line \(y = -x\):
- Plot points with coordinates where \(x\) and \(y\) have equal magnitude but opposite signs.
- Draw a line through the plotted points.
Examples
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Question
One graph shows \(y = x\) and one shows \(y = -x\). Which graph shows \(y = x\)?
Graph B is \(y = x\).
All the coordinates have equal values for \(x\) and \(y\). This is shown by the points on the line such as (10, 10) and (-4, -4).
Graph A is \(y = -x\). All the coordinates have \(x\) and \(y\) values that are equal in magnitude but with opposite signs.
This is shown by the points on the line, such as (-6, 6) and (10, -10).
Draw the graph 饾挌 = 饾拵饾挋 + 饾拕 by creating a table of values
\(m\) is a number which measures the steepness of the line. This is known as the gradient.
\(c\) is the number where the line crosses the \(y\)-axis. This is the \(y\)-intercept.
- To draw a graph of \(y = mx + c\) for given values of \(x\):
- Use the given values for \(x\) to draw a table of values for \(x\) and \(y\)
- substituteIn algebra substitute means to replace a letter (or variable) with a number. each value of \(x\) into the equation to find the valueof \(y\). Each pair of values give a coordinate.
- Use the coordinates to decide on axesTwo reference lines, one horizontal and one vertical, that cross at right-angles. They are used to define the position of a point on a grid. Axes is the plural of axis. that will take all the values of \(x\) and \(y\)
- Plot the coordinates and draw a line through the points. Label the line with the equation.
Example
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Questions
Question 1: Complete the table of values for \(y = 3x + 8\) for values of \(x\) from -2 to 2
To find the values of \(y\), each value of \(x\) is multiplied by 3 and 8 is added on.
- When \(x\) is -2, the calculation is -2 脳 3 + 8. The value of \(y\) is 2
- When \(x\) is -1, the calculation is -1 脳 3 + 8. The value of \(y\) is 5
- When \(x\) is 0, the calculation is 0 脳 3 + 8. The value of \(y\) is 8
- When \(x\) is 1, the calculation is 1脳 3 + 8. The value of \(y\) is 11
- When \(x\) is 2, the calculation is 2 脳 3 + 8. The value of \(y\) is 14
The coordinates for \(y = 3x + 8\), given by the table, are
(-2, 2), (-1, 5), (0, 8), (1, 11), and (2, 14).
A table of values can also be used to find the coordinates of a line with a negative gradient.
Question 2: Complete the table of values for \(y = 3 鈥 2x\) for values of \(x\) from -1 to 3
To find the values of \(y\), each value of \(x\) is multiplied by 2 and the result subtracted from 3
- When \(x\) = -1 the calculation is 3 鈥 2 脳 -1. The value of \(y\) is 5
- When \(x\) = 0 the calculation is 3 鈥 2 脳 0. The value of \(y\) is 3
- When \(x\) = 1 the calculation is 3 鈥 2 脳 1. The value of \(y\) is 1
- When \(x\) = 2 the calculation is 3 鈥 2 脳 2. The value of \(y\) is -1
- When \(x\) = 3 the calculation is 3 鈥 2 脳 3. The value of \(y\) is -3
The coordinates for \(y = 3x + 8\), given by the table, are
(-1, 5), (0, 3), (1, 1), (2, -1), and (3, -3).
Reading 饾挋 and 饾挌 coordinates from a graph
A position on a graph is defined by coordinates (\(x\), \(y\)). When one coordinate is given, the second can be read from the graph.
To find a \(y\)-coordinate from a given \(x\)-coordinate:
- On the \(x\)-axis, locate the given amount.
- Draw a vertical line, using a ruler, from the given amount up to the line.
- Draw a horizontal line, using a ruler, from the line across to the \(y\)-axis.
- Read the value on the \(y\)-axis.
To find an \(x\)-coordinate from a given \(y\)-coordinate:
- On the \(y\)-axis, locate the given amount.
- Draw a horizontal line, using a ruler, from the given amount across to the line.
- Draw a vertical line, using a ruler, from the line down to the \(x\)-axis.
- Read the value on the \(x\)-axis.
Examples
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Question
Use the graph to find the value of \(x\) when \(y = 3\)
On the \(y\)-axis, locate the given amount (3) and draw a horizontal line, using a ruler, across to the line.
Draw a vertical line, using a ruler, from the line down to the \(x\)-axis and read the value on the \(x\)-axis.
When \(y\) = 3, \(x\) = -2
Practise reading and plotting linear equation graphs
Quiz
Practise reading and plotting linear equation graphs with this quiz. You may need a pen and paper to help you.
Real-life maths
Linear graphs are commonly used when converting between different units of measurement.
For example, swapping between temperatures in degrees Celsius (掳C) and degrees Fahrenheit (掳F), exchanging between different currencies, such as pounds and euros, or changing inches into centimetres.
Linear graphs are useful to pharmacists and scientists in the pharmaceutical industry when working out the correct strength of drugs.
The amount of a drug for a given volume of medicine is critical, both for the medicine to be effective and for the safety of the patient.
Game - Divided Islands
Play the Divided Islands game! gamePlay the Divided Islands game!
Using your maths skills, help to build bridges and bring light back to the islands in this free game from 大象传媒 Bitesize.
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