Changing the subject of a formula
The subject of a formula is the variable that is being worked out. It can be recognised as the letter on its own on one side of the equals sign.
For example, in the formula for the area of a rectangle \(A = bh\) (\(\text{area} = \text{base} \times \text{height}\)), the subject of the formula is \(A\).
Rearranging formulae
In order to change the subject of a formula, or rearrange a formula, items in the formula need to be rearranged so a different variable is the subject. Knowledge of solving equations and inverse operationInverse operations are opposite calculations often used in solving equations. To remove +9 from a sum, perform the inverse operation which is -9. is very useful.
In the formula \(A = bh\), the area (\(A\)) is the subject of the formula which means it is the area that is being worked out.
If the area and height of a rectangle was known and the base of the rectangle was required instead, the formula \(A = bh\) wouldn't help as it is \(b\) that now needs to be calculated.
The formula \(A = bh\) needs to be rearranged to make \(b\) the subject of the formula.
\(A = bh\) means \(A = b \times h\).
To make \(b\) the subject of the formula, \(b\) needs to be isolated. In the formula above, the letter \(b\) is multiplied by \(h\). The inverse of multiplying by \(h\) is dividing by \(h\), so divide both sides by \(h\) to isolate \(b\).
\(\begin{array}{ccc} A & = & bh \\ \div h && \div h \end{array}\)
\(\frac{A}{h} = b\)
The letter \(b\) is now by itself which means \(b\) is now the subject of the formula.
To work out the base of a rectangle the formula is now \(b = \frac{A}{h}\) so divide the area (\(A\)) by the height of the rectangle (\(h\)).
Example 1
Rearrange the formula \(v = u + at\) to make \(u\) the subject of the formula.
To make \(u\) the subject of the formula means to rearrange the formula so it begins with \(u =\).
Answer this question by finding the letter \(u\) in the formula.
\(v = u + at\)
Isolate this letter by inversing any other items on this side of the equation. Next to the \(u\), there is also a \(+ at\). The inverse of adding \(at\) is subtracting \(at\), so subtract \(at\) from both sides.
\(\begin{array}{ccc} v & = & u + at \\ - at && -at \end{array}\)
\(v - at = u\)
Example 2
Rearrange the formula \(v = u + at\) to make \(t\) the subject of the formula.
\(\begin{array}{ccc} v & = & u + at \\ -u && -u \end{array}\)
\(\begin{array}{ccc} v - u & = & at \\ \div a && \div a \end{array}\)
\(\frac{v-u}{a} = t\)
The letter \(t\) is now isolated, so \(t\) is now the subject of the formula.
Question
Rearrange the formula \(P = \frac{k}{j}\) to make \(k\) the subject of the formula.
Find the letter \(k \) in the formula.
Isolate this letter by inversing any other steps on this side. The letter \(k\) here has been divided by the letter \(j\). The inverse of dividing by \(j\) is multiplying by \(j\), so multiply both sides by \(j\).
\(P = \frac{k}{j}\)
\(\begin{array}{ccc} P & = & \frac{k}{j} \\ \times j && \times j \end{array}\)
\(Pj = k\)
The letter \(k\) is now by itself, so \(k\) is now the subject of the formula.
More guides on this topic
- Algebraic expressions - Edexcel
- Solving linear equations - Edexcel
- Solving simultaneous equations - Edexcel
- Solving quadratic equations - Edexcel
- Algebraic fractions - Edexcel
- Inequalities - Edexcel
- Sequences - Edexcel
- Straight line graphs - Edexcel
- Other graphs - Edexcel
- Transformation of curves - Higher - Edexcel
- Using and interpreting graphs - Edexcel