Number - Indices and Standard Form

Simplify $(3x^2 y^{-3})^3$ leaving your answer with positive indices.

$\frac{27x^6}{y^9}$

Apply the power to each term inside the bracket: $3^3 \cdot (x^2)^3 \cdot (y^{-3})^3 = 27x^6 y^{-9}$. To write with positive indices, use the rule $a^{-n} = \frac{1}{a^n}$ to move $y^{-9}$ to the denominator.

Evaluate $125^{-\frac{2}{3}}$.

$\frac{1}{25}$

First, handle the negative index: $125^{-\frac{2}{3}} = \frac{1}{125^{2/3}}$. Then, apply the fractional index rule: $125^{2/3} = (\sqrt[3]{125})^2 = 5^2 = 25$. Thus, the result is $\frac{1}{25}$.

Calculate $(4.5 \times 10^7) \times (2 \times 10^{-3})$, giving your answer in standard form.

$9 \times 10^4$

Multiply the coefficients ($4.5 \times 2 = 9$) and use the index law for the powers of 10 ($10^7 \times 10^{-3} = 10^{7-3} = 10^4$). Since $9$ is between 1 and 10, the answer is already in standard form.

Work out $(3.2 \times 10^5) + (6 \times 10^4)$, giving your answer in standard form.

$3.8 \times 10^5$

To add, the powers of 10 must be the same. Convert $6 \times 10^4$ to $0.6 \times 10^5$. Then add the coefficients: $(3.2 + 0.6) \times 10^5 = 3.8 \times 10^5$.