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3 years ago

The value of 8s in 6588

Mathematics

1 answer:

ASHA 777 [7]3 years ago

4 0

The value of 8s in 6588 is 80,8

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Angela needs to leave the house by 11:00 am. She wakes up at 7:00 am. How many minutes does she have to get ready?

wariber [46]

Answer:

240 min

Step-by-step explanation:

11-7=4

4*60=240

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3 years ago

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What is the distance between the points (14, 29) and (14, 58) in the coordinate plane?

ss7ja [257]

$Distance= \sqrt{(x_{2}-x_{1}) ^{2}+(y_{2}-y_{1})^2} = \sqrt{(58-29)^{2}+(14-14)^{2}} =29

But because x_{1}=x_{2}, 

 and it is a vertical segment, 

it is enough to find abs(y_{2} -y_{1})=|58-29|=29$

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3 years ago

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In French how would you conjugate verbs with "on"?

mafiozo [28]

You conjugate verbs with the pronoun 'on' the same way you conjugate verbs with pronouns 'il/elle'. "On" means "one", qs in "One can do x or y."

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3 years ago

Find the limit of the function by using direct substitution.

serg [7]

Answer:

Option a.

$\lim_{x \to \frac{\pi}{2}}(3e)^{xcosx}=1$

Step-by-step explanation:

You have the following limit:

$\lim_{x \to \frac{\pi}{2}{(3e)^{xcosx}$

The method of direct substitution consists of substituting the value of $\frac{\pi}{2}$ in the function and simplifying the expression obtained.

We then use this method to solve the limit by doing $x=\frac{\pi}{2}$

Therefore:

$\lim_{x \to \frac{\pi}{2}}{(3e)^{xcosx} = \lim_{x\to \frac{\pi}{2}}{(3e)^{\frac{\pi}{2}cos(\frac{\pi}{2})}$

$cos(\frac{\pi}{2})=0\\$

By definition, any number raised to exponent 0 is equal to 1

$\lim_{x\to \frac{\pi}{2}}{(3e)^{\frac{\pi}{2}cos(\frac{\pi}{2})} = \lim_{x\to \frac{\pi}{2}}{(3e)^{\frac{\pi}{2}(0)}\\\\$

$\lim_{x\to \frac{\pi}{2}}{(3e)^{0}} = 1$

Finally

$\lim_{x \to \frac{\pi}{2}}(3e)^{xcosx}=1$

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3 years ago

9. Are there any outliers in the data from question #7?

Arisa [49]

Answer:

A) Yes; Week 10 is an outlier since it is the greatest data point.

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2 years ago