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3 years ago

5

It cost 45$ to rent a car each day. There is also a fee of 12$. How much does it cost to rent a car for 5 days including the fee

?

2 answers:

seropon [69]3 years ago

6 0

45 times five is 225 plus 12 Is 237

bixtya [17]3 years ago

6 0

It costs $237.
45x+12
45 times 5=$225
225+12=237

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Iteru [2.4K]

Answer:

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Step-by-step explanation:

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2 years ago

It takes Mara 50 minutes to walk to her friends house 1 2/3 miles away. What is her walking pace in miles per hour?

Marizza181 [45]

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2 years ago

Pablo wants to build a rectangular pen for the pig he is raising in his agriculture class. Pablo only has 36 feet of fencing. Wh

Ratling [72]

Answer:

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Step-by-step explanation:

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3 years ago

-2.2 + 0.3z= 3 -0.5z -0.8z<br><br> what does z equal

sineoko [7]

Add 2.2 to each side so 0.3z = 5.2 - 0.5z -0.8z
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3 years ago

Read 2 more answers

Which expression is equivalent??? help!

dexar [7]

Answer:

The equivalent expression for the given expression $\sqrt[3]{256x^{10}y^{7} }$ is

$4x^{3} y^{2}(\sqrt[3]{4xy} )$

Step-by-step explanation:

Given:

$\sqrt[3]{256x^{10}y^{7} }$

Solution:

We will see first what is Cube rooting.

$\sqrt[3]{x^{3}} = x$

Law of Indices

$(x^{a})^{b}=x^{a\times b}\\and\\x^{a}x^{b} = x^{a+b}$

Now, applying above property we get

$\sqrt[3]{256x^{10}y^{7} }=\sqrt[3]{(4^{3}\times 4\times (x^{3})^{3}\times x\times (y^{2})^{3}\times y )} \\\\\textrm{Cube Rooting we get}\\\sqrt[3]{256x^{10}y^{7} }= 4\times x^{3}\times y^{2}(\sqrt[3]{4xy}) \\\\\sqrt[3]{256x^{10}y^{7} }= 4x^{3}y^{2}(\sqrt[3]{4xy})$

∴ The equivalent expression for the given expression $\sqrt[3]{256x^{10}y^{7} }$ is

$4x^{3} y^{2}(\sqrt[3]{4xy} )$

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3 years ago