{{asɛmtiNe Ɔkyerɛwfo}} | Nhomakorabea | Nneɛma a ɛma wotumi yɛ ade

Akwankyerɛ

In all equations, do NOT set it equal to $x=$ or $y=$. If your answer is $x=5$, simply write in 5 as your answer.

2

$(2x)^{2}\cdot2x^{4}=$

${4x}^{6}$

${4x}^{8}$

${64x}^{6}$

${8x}^{6}$

A512

2

$\frac{x^6}{x^{12}}=$

$\frac{1}{x^2}$

${x}^{18}$

$\frac{2}{x^2}$

$\frac{1}{x^6}$

A512

2

$(\frac{1}{2})^{-3}=$

$-\frac{3}{2}$

$-8$

$8$

$\frac{1}{8}$

N 605

1

${25x}^{2}=(5x)^{2}$

Nokorɛ

Ɛnyɛ ampa

A509

1

In the term ${-12x}^{3}$, $-12$ is the base.

Nokorɛ

Ɛnyɛ ampa

1

$\sqrt{12}\sqrt{12}=12$

Nokorɛ

Ɛnyɛ ampa

A509

1

$\frac{5}{\sqrt5}=\sqrt{5}$

Nokorɛ

Ɛnyɛ ampa

A509

4

Solve for $x$: $3^{x}=1$

N 605

4

Solve for $x$: $(\frac{1}{3})^{x}=3$

N 605

4

Solve for $x$: $x^{3}=-8$

A510

4

Simplify: $5\sqrt{3}-\sqrt{3}$

A509

4

Simplify: $(6\sqrt{5})^{2}$

N 605

4

Simplify so there are no negative exponents:
$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

A512

4

If $\sqrt{2x+3}-7=2$, what is $\frac{1}{3}{x}$?

A509

4

Rationalize and simplify:
$\frac{12}{\sqrt{6}}$

A509

4

Solve for $x$:
$\sqrt[3]{x}-4=0$

A510

Chapter 9 Test: Exponents and Radicals

Chapter 9 Test: Exponents and Radicals

$(2x)^{2}\cdot2x^{4}=$

$\frac{x^6}{x^{12}}=$

$(\frac{1}{2})^{-3}=$

${25x}^{2}=(5x)^{2}$

In the term ${-12x}^{3}$, $-12$ is the base.

$\sqrt{12}\sqrt{12}=12$

$\frac{5}{\sqrt5}=\sqrt{5}$

Solve for $x$: $3^{x}=1$

Solve for $x$: $(\frac{1}{3})^{x}=3$

Solve for $x$: $x^{3}=-8$

Simplify: $5\sqrt{3}-\sqrt{3}$

Simplify: $(6\sqrt{5})^{2}$

Simplify so there are no negative exponents:
$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

If $\sqrt{2x+3}-7=2$, what is $\frac{1}{3}{x}$?

Rationalize and simplify:
$\frac{12}{\sqrt{6}}$

Solve for $x$:
$\sqrt[3]{x}-4=0$

$(2x)^{2}\cdot2x^{4}=$

$\frac{x^6}{x^{12}}=$

$(\frac{1}{2})^{-3}=$

${25x}^{2}=(5x)^{2}$

In the term ${-12x}^{3}$, $-12$ is the base.

$\sqrt{12}\sqrt{12}=12$

$\frac{5}{\sqrt5}=\sqrt{5}$

Solve for $x$: $3^{x}=1$

Solve for $x$: $(\frac{1}{3})^{x}=3$

Solve for $x$: $x^{3}=-8$

Simplify: $5\sqrt{3}-\sqrt{3}$

Simplify: $(6\sqrt{5})^{2}$

Simplify so there are no negative exponents:
$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

If $\sqrt{2x+3}-7=2$, what is $\frac{1}{3}{x}$?

Rationalize and simplify:
$\frac{12}{\sqrt{6}}$

Solve for $x$:
$\sqrt[3]{x}-4=0$

Chapter 9 Test: Exponents and Radicals

Chapter 9 Test: Exponents and Radicals

$(2x)^{2}\cdot2x^{4}=$

$\frac{x^6}{x^{12}}=$

$(\frac{1}{2})^{-3}=$

${25x}^{2}=(5x)^{2}$

In the term ${-12x}^{3}$, $-12$ is the base.

$\sqrt{12}\sqrt{12}=12$

$\frac{5}{\sqrt5}=\sqrt{5}$

Solve for $x$: $3^{x}=1$

Solve for $x$: $(\frac{1}{3})^{x}=3$

Solve for $x$: $x^{3}=-8$

Simplify: $5\sqrt{3}-\sqrt{3}$

Simplify: $(6\sqrt{5})^{2}$

Simplify so there are no negative exponents:$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

If $\sqrt{2x+3}-7=2$, what is $\frac{1}{3}{x}$?

Rationalize and simplify:$\frac{12}{\sqrt{6}}$

Solve for $x$:$\sqrt[3]{x}-4=0$

$(2x)^{2}\cdot2x^{4}=$

$\frac{x^6}{x^{12}}=$

$(\frac{1}{2})^{-3}=$

${25x}^{2}=(5x)^{2}$

In the term ${-12x}^{3}$, $-12$ is the base.

$\sqrt{12}\sqrt{12}=12$

$\frac{5}{\sqrt5}=\sqrt{5}$

Solve for $x$: $3^{x}=1$

Solve for $x$: $(\frac{1}{3})^{x}=3$

Solve for $x$: $x^{3}=-8$

Simplify: $5\sqrt{3}-\sqrt{3}$

Simplify: $(6\sqrt{5})^{2}$

Simplify so there are no negative exponents:$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

If $\sqrt{2x+3}-7=2$, what is $\frac{1}{3}{x}$?

Rationalize and simplify:$\frac{12}{\sqrt{6}}$

Solve for $x$:$\sqrt[3]{x}-4=0$

Simplify so there are no negative exponents:
$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

Rationalize and simplify:
$\frac{12}{\sqrt{6}}$

Solve for $x$:
$\sqrt[3]{x}-4=0$

Simplify so there are no negative exponents:
$\frac{18x^{3}y^{3}}{12x^{6}y^{2}}$

Rationalize and simplify:
$\frac{12}{\sqrt{6}}$

Solve for $x$:
$\sqrt[3]{x}-4=0$