5 Key Concepts That Will Help You Master GCSE Maths
If you have just started your GCSE course or if you’re already halfway through, it’s always a good time to refresh your understanding of the essential concepts. This will help you to boost your confidence and your grades!
Here’s a run-down of some key Maths concepts that will help you soar in lessons this year.
1. How to find the equation of a straight line
This is a topic almost guaranteed to come up in any GCSE Maths exam. Once you’ve gotten the hang of it, it couldn’t be easier!
The general equation of a straight line is y = mx + c, where:
- m is the gradient (how steep the line is). The bigger the number, the steeper it is. If it’s negative the line will go down, not up.
- c is the y-intercept (where the line crosses the y-axis). This point has coordinates (0, c)
If you know the coordinates of two points on the line (x and y) you can work out the equation of that line.
You’d be surprised at the number of GCSE students who still get confused when it comes to calculating the mean, mode, and median of a data set.
- The median is the middle value when the data is arranged from smallest to largest (if there are two middle values, the median is halfway between these values)
- You can calculate the mean by adding together all of the values in the data set and dividing them by the number of items in the set
- The mode is the value which appears most frequently in the data set
For more on this topic, including how to calculate range and interquartile range, check out this revision video!
3. Geometry: Key Formulae
This is no time for excuses! Learn these formulae and you’ll be over the first hurdle when it comes to answering geometry questions with confidence.
Once you’ve committed these formulae to memory, build on your knowledge by checking out our ‘Geometry and Measures’ revision videos.
4. Mastering percentage increase and decrease
To successfully increase and decrease a value by a percentage, it’s important to understand that you always start with 100%.
If you want to find out what 85% of that value is, you’ll multiply the original value by 0.85. If you want to find out what 63% of a value is, you’ll multiple the original value by 0.63. Get the gist?
Finding 85% is the SAME as reducing the original value by 15%. Finding 63% is the same as reducing the original value by 37%.
5. Your calculator can be your best friend in Maths lessons (IF you know how to use it properly)
Despite the incredible computing power of a typical calculator, it can be difficult to use it correctly. With so many settings and functions available, simple mistakes can lead to a whole host of problems with your calculations!
Make sure you’ve read your calculator instruction manual or, even better, watched the instruction videos on the manufacturer’s website before using your calculator.
We have also created step-by-step video guides to help you use your calculator effectively and make the most out of this brilliant tool.
Once you’ve understood the techniques, test your skills with some past paper calculator Topic Questions. Check out our video solutions as you mark your work, to ensure you’re using the right methods to get to your answer, and spot where you might be going wrong.
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Amy studied at the University of Bristol and is our revision blog guru. She only graduated recently so understands the pressures of being a student better than most, and is here to share her wisdom so that you revise effectively, smash your exams, succeed at school and write cracking university and job applications.