大象传媒

Key points

Image caption,
Simultaneous equations like 饾挌 = 2饾挋 - 1 and 饾挌 = 饾挋 + 1 can be represented graphically.
  • equations are two or more equations that share .
    For example, \(y\) = 2\(x\) - 1 and \(y\) = \(x\) + 1 share the variables \(x\) and \(y\). They are simultaneous because the equations are solved at the same time.

  • Simultaneous equations can be represented using a bar model, but they can also be represented graphically.

  • To solve simultaneous equations graphically, it is essential to be able to draw the graph of a straight line.

Image caption,
Simultaneous equations like 饾挌 = 2饾挋 - 1 and 饾挌 = 饾挋 + 1 can be represented graphically.
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Representing equations graphically

  • Simultaneous equations can be solved algebraically or graphically.

  • Each equation is used to create a table of values, which are then plotted as pairs on the same set of .

  • Graphs are often written in the form \(y\) = \(mx\) + \(c\), where \(m\) is the (how steep the line is) and \(c\) is the \(y\)-.

  • If the two lines cross, then the coordinates of this are the solutions to the simultaneous equations. If the lines are parallel (and therefore do not intersect), there is no solution.

Example

Image gallerySkip image gallerySlide 1 of 8, The image shows the equations of two functions. Y equals x plus one. Written below: y equals two x subtract one., Use the graphical method to solve the simultaneous equations.

Question

What is the solution to the pair of equations \(y\) = \(x\) + 3 and \(y\) = 2\(x\) + 1?

The image shows a set of axes. The horizontal axis is labelled x. The values are increasing in units of two from negative two to positive six. The vertical axis is labelled y. The values are increasing in units of two from zero to ten. The functions y equals two x plus one and y equals x plus three are plotted and labelled on the axes. The line for the function y equals two x plus one is coloured blue. The line for the function y equals x plus three is coloured orange.

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Rearranging equations to solve problems

  • To be able to solve simultaneous equations, both equations need to be in the form \(y\) = \(mx\) + \(c\)

  • If the equations are not in the form \(y\) = \(mx\) + \(c\), the equations need to be rearranged.

Example

Image gallerySkip image gallerySlide 1 of 7, The image shows the equations of two functions. Y equals two x. Written below: y plus two x equals four., Use the graphical method to solve the simultaneous equations.

Question

What is the solution to the pair of equations \(y\) = \(x\) + 5 and \(y\) = 7 鈭 \(x\)?

The image shows a set of axes. The horizontal axis is labelled x. The values are increasing in units of one from negative one to positive seven. The vertical axis is labelled y. The values are increasing in units of one from zero to seven.  The functions y equals x plus five and y equals seven subtract x are plotted and labelled on the axes. The line for the function y equals x plus five is coloured orange. The line for the function y equals seven subtract x is coloured blue.

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Practise solving equations graphically

Practise solving equations graphically with this quiz. You may need a pen and paper to help you with your answers.

Quiz

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Real-life maths

The image shows a set of axes. The horizontal axis is labelled output, units. The values are increasing in units of twenty from zero to two hundred. The vertical axis is labelled cost and revenue in pounds. The values are increasing in units of four hundred from zero to two thousand. Two linear functions are plotted showing total costs and revenue. These intersect at a point where the company break even. The region between the two lines to the left represents a loss. The region between the two lines to the right represents a profit.
Image caption,
This graph shows the break-even point for a company looking at their costs and outputs.
  • A company will use graphs of simultaneous equations to model the potential profits it can make by selling its products at a different price. The company will have fixed costs and costs, depending on how much of something it produces.

  • will be made by multiplying the sale price by the number of units sold. Where the two lines on the graph intersect will be the 鈥榖reak-even鈥 point (the number of sales needed before the company begins to make a profit). Using a spreadsheet, the company can make financial decisions, including the profits they might make or the effect of lowering (or raising) the price of what it sells.

The image shows a set of axes. The horizontal axis is labelled output, units. The values are increasing in units of twenty from zero to two hundred. The vertical axis is labelled cost and revenue in pounds. The values are increasing in units of four hundred from zero to two thousand. Two linear functions are plotted showing total costs and revenue. These intersect at a point where the company break even. The region between the two lines to the left represents a loss. The region between the two lines to the right represents a profit.
Image caption,
This graph shows the break-even point for a company looking at their costs and outputs.
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Game - Divided Islands

Play the Divided Islands game! 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.

Play the Divided Islands game!
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