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3 years ago

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Find the volume of the solid figure shown below. The area of the base is 32 square feet, and the height of the figure is 10 feet

.
42 ft3
94 ft3
62 ft3
320 ft3

1 answer:

Ket [755]3 years ago

3 0

I think it is gonna be 320 because the others don’t make sense

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Use mathematical induction to prove that for each integer n > 4,5" > 2^2n+1 + 100.

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Answer:

The inequality that you have is $5^{n}>2^{2n+1}+100,\,n>4$ . You can use mathematical induction as follows:

Step-by-step explanation:

For $n=5$ we have:

$5^{5}=3125$

$2^{(2(5)+1)}+100=2148$

Hence, we have that $5^{5}>2^{(2(5)+1)}+100.$

Now suppose that the inequality holds for $n=k$ and let's proof that the same holds for $n=k+1$ . In fact,

$5^{k+1}=5^{k}\cdot 5>(2^{2k+1}+100)\cdot 5.$

Where the last inequality holds by the induction hypothesis.Then,

$5^{k+1}>(2^{2k+1}+100)\cdot (4+1)$

$5^{k+1}>2^{2k+1}\cdot 4+100\cdot 4+2^{2k+1}+100$

$5^{k+1}>2^{2k+3}+100\cdot 4$

$5^{k+1}>2^{2(k+1)+1}+100$

Then, the inequality is True whenever $n>4$ .

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Hello.

To get the volume 5184 in3 you can use the dimension 18in x 24in x 12in.

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Pablo graphs a system of equations. One equation is quadratic and the other equation is linear. What is the greatest number of p

Nady [450]

For this case we have the following type of equations:
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$y = ax ^ 2 + bx + c
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