Leaving Cert Mathematics Algebra: a) Write $6^{-2}$ and $8^{rac{1

Question

a) Write $6^{-2}$ and $8^{rac{1}{2}}$ without using indices.

$6^{-2} = \frac{1}{6^{2}} = \frac{1}{36}$

$8^{\frac{1}{2}} = \sqrt{8} = \sqrt{4 \cdot 2} = 2\sqrt{2}$

b) Express $2^{24}$ in the form $a 	imes 10^{n}$, where $1 \leq a < 10$ and $n \in \mathbb{Z}$, correct to three significant figures.

From a calculator, we know that $2^{24} = 16,777,216$ so we can write this as $1.678 	imes 10^{7}$ correct to three decimal places.

c) Show that $\frac{(a\sqrt{a})^{3}}{a^{4}}$ simplifies to $\sqrt{a}$.

Firstly we simplify the top line. Note that, as in part (a) we can write $\sqrt{a} = a^{\frac{1}{2}}$. Now we have

$$\frac{(a\sqrt{a})^{3}}{a^{4}} = \frac{(a a^{\frac{1}{2}})^{3}}{a^{4}} = \frac{(a^{\frac{5}{2}})^{3}}{a^{4}} = \frac{a^{\frac{15}{2}}}{a^{4}} = a^{\frac{15}{2}-4} = a^{\frac{7}{2}} = \sqrt{a}.$$

d) Solve the equation $49^{y} = 7^{2y + 2}$ and verify your answer.

We can rewrite the left hand side of the equation as $49^{y} = (7^{2})^{y} = 7^{2y}$ so our equation becomes $7^{2y} = 7^{2y + 2}$. We equate the indices, getting $2y = 2y + 2$, which is true when $y = -1$.

To verify this we check that $49^{-1} = 7^{2(-1) + 2}$, which is indeed true.

a) Write $6^{-2}$ and $8^{rac{1}{2}}$ without using indices - Leaving Cert Mathematics - Question 1 - 2014

Worked Solution & Example Answer:a) Write $6^{-2}$ and $8^{rac{1}{2}}$ without using indices - Leaving Cert Mathematics - Question 1 - 2014

Write $6^{-2}$ and $8^{\frac{1}{2}}$ without using indices.

Express $2^{24}$ in the form $a \times 10^{n}$, where $1 \leq a < 10$ and $n \in \mathbb{Z}$, correct to three significant figures.

Show that $\frac{(a\sqrt{a})^{3}}{a^{4}}$ simplifies to $\sqrt{a}$.

Solve the equation $49^{y} = 7^{2y + 2}$ and verify your answer.

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a) Write $6^{-2}$ and $8^{ rac{1}{2}}$ without using indices - Leaving Cert Mathematics - Question 1 - 2014

Worked Solution & Example Answer:a) Write $6^{-2}$ and $8^{ rac{1}{2}}$ without using indices - Leaving Cert Mathematics - Question 1 - 2014