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Understanding terms and expressions

In algebra, letters are used when numbers are not known.

Algebraic terms, such as \(2s\) or \(8y\), leave the multiplication signs out.

So rather than \(2 \times s\), write \(2s\), and rather than \(8 \times y\) write \(8y\).

The number must always be written before the letter, for example, \(4a\) rather than \(a4\).

A string of numbers and letters joined together by mathematical operations such as \(+\) and \(-\) is called an algebraic expression, for example \(r + 2s\).

Algebraic terms that have the same letter are called like terms.

Only like terms can be added or subtracted.

\(9b\), \(-7b\) and \(13b\) are like terms, but \(6t\), \(5x\) and \(-11z\) are not like terms.

When like terms are added and subtracted, it is called simplifying.

Example

The Khan family and the Norman family visit the zoo together - there are \({8}\) children and \({7}\) adults in the group.

Because there are more than \({10}\) people, the families can take advantage of a special offer - \({1}\) child can be admitted free of charge.

As before if we use \({g}\) for the cost of child admission and \({k}\) for the cost of adult admission, then:

Cost for the Khan family \(= 3g + 3k\)

Cost for the Norman family \(= 5g + 4k\)

Offer \(= - g\)

Total cost \(= 3g + 3k + 5g + 4k - g\)

Simplified \(= 3g + 5g - g + 3k + 4k = 7g + 7k\).

+ and - signs

A term, like a number, belongs with the sign that sits in front of it.

So in the expression \(2k - g\), the \(g\) belongs with the \(-\) sign that sits in front of it, so it is \(- g\).

If the first term in an expression has no sign in front of it then it is positive.

There is no sign in front of \(2k\) - therefore it is positive.

Example: + and - signs

Collect all the like terms together for \(3g + 3k + 5g + 4k - g\).

Gathering all the \(g\)s and \(k\)s together would give \(3g + 5g - g + 3k + 4k\).

When you add or subtract terms, keep each term with their \(+\) or \(-\) sign.

Remember that any term containing the same letter can be combined by adding and subtracting.

So: \(3g + 3k + 5g + 4k - g\)

\(= 3g + 5g - g + 3k + 4k\)

\(= 7g + 7k\)

Like terms that include powers can only be added or subtracted if the powers are the same.

Like terms with different powers cannot be added or subtracted.

Example - Collecting like terms

Simplify:

\(3x + 5 + {x}^{2} - 2x + {2x}^{2} - 1\)

Answer

Rearrange the expression so that like terms with the same powers are next to each other:

\({x}^{2} + {2x}^{2} + 3x - 2x + 5 - 1\)

And then simplify:

\({3x}^{2} + x + 4\)

We usually write the expression with the \({x}^{2}\) term first, then the \({x}\) term, and finally the number term.

Algebraic terms and expressions can be multiplied in the same way as numbers.

\(a \times a = a^2\)

\(b \times b = b^2\) etc

Remember that \(2a\) is not the same as \(a^2\)

\(2a = 2 \times a\)

\(a^2 = a \times a\)

In general, \(a^m \times a^n = a^{(m + n)}\).

\(x\) is the same as \(x^1\).

For example, \(n^3 \times n = n^3 \times n^1 = n^{(3 + 1)} = n^4\).

Multiplying letters and numbers

Multiply letters and the numbers separately:

\(2 \times 3a\) means \(2 \times 3 \times a\) which is \(6a\).

\(4a \times 5a\) means \(4 \times a \times 5 \times a\) which is \(4 \times 5 \times a \times a = 20a^2\).