Transum Software

Factorising

Factorise algebraic expressions in this structured online self marking exercise.

Menu Level 1 Level 2 Level 3 Level 4 Level 5 Level 6 Level 7 Level 8 Level 9 Help Algebra

This is level 7: factorising a quadratic where the squared term coefficient is 1. You can earn a trophy if you get at least 9 questions correct and you do this activity online.

\(x² + 7x + 12\)

Correct Wrong

\(x² + 6x + 8\)

Correct Wrong

\(x² + 13x + 42\)

Correct Wrong

\(v² − 7v + 12\)

Correct Wrong

\(v² − 10v + 24\)

Correct Wrong

\(v² − 15v + 56\)

Correct Wrong

\(y² − 2y − 8\)

Correct Wrong

\(y² + 2y − 24\)

Correct Wrong

\(y² + 4y − 21\)

Correct Wrong

\(w² + w − 12\)

Correct Wrong

\(w² + w − 306\)

Correct Wrong

\(w² − 36w + 315\)

Correct Wrong

Check

This is Factorising level 7. You can also try:
HCF Level 1 Level 2 Level 3 Level 4 Level 5 Level 6 Level 8 Level 9 More Quadratics Expanding Brackets More Algebra

Instructions

Try your best to answer the questions above. Type your answers into the boxes provided leaving no spaces. As you work through the exercise regularly click the "check" button. If you have any wrong answers, do your best to do corrections but if there is anything you don't understand, please ask your teacher for help.

When you have got all of the questions correct you may want to print out this page and paste it into your exercise book. If you keep your work in an ePortfolio you could take a screen shot of your answers and paste that into your Maths file.

Why am I learning this?

Mathematicians are not the people who find Maths easy; they are the people who enjoy how mystifying, puzzling and hard it is. Are you a mathematician?

Comment recorded on the 10 September 'Starter of the Day' page by Carol, Sheffield PArk Academy:

"3 NQTs in the department, I'm new subject leader in this new academy - Starters R Great!! Lovely resource for stimulating learning and getting eveyone off to a good start. Thank you!!"

Comment recorded on the 28 May 'Starter of the Day' page by L Smith, Colwyn Bay:

"An absolutely brilliant resource. Only recently been discovered but is used daily with all my classes. It is particularly useful when things can be saved for further use. Thank you!"

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Answers

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Go Maths

Learning and understanding Mathematics, at every level, requires learner engagement. Mathematics is not a spectator sport. Sometimes traditional teaching fails to actively involve students. One way to address the problem is through the use of interactive activities and this web site provides many of those. The Go Maths page is an alphabetical list of free activities designed for students in Secondary/High school.

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Are you looking for something specific? An exercise to supplement the topic you are studying at school at the moment perhaps. Navigate using our Maths Map to find exercises, puzzles and Maths lesson starters grouped by topic.

Teachers

If you found this activity useful don't forget to record it in your scheme of work or learning management system. The short URL, ready to be copied and pasted, is as follows:

Alternatively, if you use Google Classroom, all you have to do is click on the green icon below in order to add this activity to one of your classes.

It may be worth remembering that if Transum.org should go offline for whatever reason, there is a mirror site at Transum.info that contains most of the resources that are available here on Transum.org.

When planning to use technology in your lesson always have a plan B!

Callum Arthur,

Tuesday, August 29, 2017

Do you have any comments? It is always useful to receive feedback and helps make this free resource even more useful for those learning Mathematics anywhere in the world. Click here to enter your comments.

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Description of Levels

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Level 1 - Factorising an expression with a constant factor.

Example: 40h + 88

Level 2 - Factorising an expression with a variable factor.

Example: 23h + 3h²

Level 3 - Factorising an expression with both a constant and variable factor.

Example: 10a + 2ab

Level 4 - Completely factorising an expression of two parts that can be separately factorised.

Example: 3a + ab + 5w + 4wy

Level 5 - Writing an expression as the product of two binomials.

Example: 5a + 5b + ac + bc

Level 6 - Factorising an expression which is the difference between two squares.

Example: c² - 81

Level 7 - Factorising a quadratic where the squared term coefficient is 1.

Example: c² - 13c + 36

Level 8 - Factorising a quadratic where the squared term coefficient is not 1.

Example: 4a² + 5a - 6

Level 9 - Mixed factorisation questions

Example: b² + 6b + 9

Projectable large format factorising quadratics exercise suitable for whole class use.

Answers to this exercise are available lower down this page when you are logged in to your Transum account. If you don’t yet have a Transum subscription one can be very quickly set up if you are a teacher, tutor or parent.

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Video

Examples

This program checks your answers by matching the text you have typed in with the options it has as the correct answer. For that reason it does not always recognise equivalent correct answers. For example the factorisation of 6a+21 can be written as 3(2a+7) or 3(7+2a) but the program may only recognise the first option as the correct answer. Please type in your answers so that the terms are in alphabetical order of the variables followed by the constants unless a negative cooeficient of the viariable makes the opposite a more elegant solution.

Level 1 example: \(40h + 88\)

Identify a common factor of 8 to give \(8(5h+11)\)

Level 2 example: \(23h + 3h²\)

Identify a common factor of h to give \(h(23+3h)\)

Level 3 example: \(10a + 2ab\)

Identify a common factor of 2a to give \(2a(5+b)\)

Level 4 example: \(3a + ab + 5w + 4wy\)

Identify common factors of pairs of terms to give \(a(3+b)+w(5+4y)\)

Level 5 example: \(5a + 5b + ac + bc\)

Extract common factors of pairs of terms to give \(5(a+b) + c(a+b)\)
Then extract a common factor of (a+b) to give \((a+b)(5+c)\)

Level 6 example: \(c² - 81\)

This can be written as \( (c+9)(c-9) \). Expand the brackets to see why

Level 7 example: \(c² - 13c + 36\)

Start by finding two numbers with a product of 36 and sum of -13
These numbers are -4 and -9
So the factorisation is \( (c-4)(c-9) \)

Level 8 example: \(4a² + 5a - 6\)

Multiply the coefficient of a² by the constant term: \( 4 \times -6 = -24 \)
Now find two numbers with a product of -24 and sum of 5 (the coefficient of a)
These numbers are -3 and 8
Write the original expression with the middle term split into these two numbers: \( 4a^2-3a+8a-6\)
Extract common factors of pairs of terms to give \( a(4a-3) + 2(4a-3)\)
Then extract a common factor of (4a-3) to give \((a+2)(4a-3)\)

Level 9 example: \(b² + 6b + 9\)

Use the techniques used in the previous levels

Don't wait until you have finished the exercise before you click on the 'Check' button. Click it often as you work through the questions to see if you are answering them correctly. You can double-click the 'Check' button to make it float at the bottom of your screen.

Answers to this exercise are available lower down this page when you are logged in to your Transum account. If you don’t yet have a Transum subscription one can be very quickly set up if you are a teacher, tutor or parent.

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