Exam-Style Questions.Problems adapted from questions set for previous Mathematics exams. |
1. | GCSE Higher |
Simplify the following expressions:
(a)
$$ a^7 \times a^8 $$(b)
$$ 7b^9 + 8b^9 $$(c)
$$ (2c)^5 \times c^{-3} $$(d)
$$ (d^4 e^3) \div (d^{-1} e^3) $$2. | GCSE Higher |
Without using a calculator, show clearly that \(27^{\frac23}\) is equal to \(9\).
3. | GCSE Higher |
Work out the exact value of \(n\).
4. | GCSE Higher |
Without using a calculator find the values of the following:
(a) \(25^{-\frac12} \)
(b) \( \left( \frac{27}{64} \right)^{ \frac23} \)
5. | GCSE Higher |
(a) The \(n\)th term of a sequence is \(2^n+2^{n+1}\)
Work out the 8th term of the sequence.
(b) The \(n\)th term of a different sequence is \(9(3^n + 3^{n+1})\)
Expand and express this expression as the sum of two powers of three.
6. | GCSE Higher |
If a, b and c are positive integers use the following statements to find the values of a, b and c.
$$ (ab^c)^3 = 27b^{21} $$ $$ b= 9a $$7. | GCSE Higher |
\(y = a \times b^{x – 2}\) where \(a\) and \(b\) are numbers.
\(y = 5\) when \(x = 2\)
\(y = 0.005\) when \(x = 5\)
Work out the value of \(y\) when \(x = 4\)
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