CoolStuffYT

The vertex is right between the focus and directrix, according to your definition.

Therefore, the vertex is at (4, 2).

That means the parabola passes through (4, 2).

It also passes through (8, 6), as said in the problem.

This means it also passes through (0, 6). This is because parabolas are symmetric, and this one is symmetric at x=4.

Now we have three points. We can find the parabolic equation.

Substituting (4, 2) into the equation we get \(2=16a+4b+c\).

(8, 6) gets us \(6=64a+8b+c\).

And finally, (0, 6) gets us \(6=c\).

We have that c=6, so now the two equations are

\(16a+4b=-4 \\ 64a+8b=0\)

I'm sure you can solve this on your own; anyways, we get that \(a=-\frac{1}{4}\) and that \(b=2\).

Therefore, our equation is \(y=-\frac{1}{4}x+2x+6, \text{ so } a\cdot b\cdot c = -\frac{1}{4}\cdot 2\cdot 6=\fbox{-3}.\)

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If there are 10 such rectangular figures, then there must be 10 factor pairs, or 20 total factors in the number of tiles.

Therefore, all you have to find the smallest number with 20 factors in it.

I hope you can go from there

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586,314,988.

Or about 4 times the population of Russia

This is a file from your computer, not a link.

Two complex numbers: c+di and e+fi.

The product is (c+di)(e+fi) = ce+cfi+dei+dfi^2 = (ce-df)+i(cf+de)

Can you go from here?

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Answer: 1108 in^2

Explanation:

Let's first find the surface area of the top triangular prism part.

There are two 11x20 rectangles, and two triangles with base 12 and height 9.

For the rectangular prism on bottom, we have one rectangle of 12x20, two of 20x5, and two of 12x5.

Adding everything up, 11x20+11x20+12x9/2+12x9/2+12x20+20x5+20x5+12x5+12x5 is pretty tedious, but managable.

440+108+240+200+120=548+560=1108 in ^2.

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https://web2.0calc.com/questions/geometry-help_105

Look at the hint: Law of Sines!

You need a calculator for this, but I'll help you through

angle B is 12 degrees and side b is 10 cm, so the ratio of sin B to b is \(\frac{\sin 12}{10}\).

This is 0.02079 (you need a calculator)

Can you now find side length a? angle A is 150 degrees, so do 0.02079=sin150/a and solve for a.

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The area of a trapezoid is the sum of the bases divided by 2, all multiplied by the height.

Here, the two bases are 12 and 20, and the height is 15.

Find \(\frac{12+20}{2}\times 15\), which is the area of the barn.

Finally, subtract the door size. I think you can do that.

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Answer: 72

Explanation:

ALWAYS DRAW A DIAGRAM

First find the measure of an interior angle of a decagon.

180-360/n, n=10, so it's 144 degrees.

There are trapezoids GHIJ and DEFG, where DE and FG and GH and IJ are congruent and equal the side length.

The angle HGJ is one angle of the trapezoid GHIJ, and we can find that angle is 36 degrees (remember to draw it out).

Same with angle FGD.

Therefore, angle DGJ is 144 (the interior angle) minus 36 twice, or 144-36*2=72 degrees.

a=72.

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:P