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There are 20 consecutive even numbers. How much bigger is the sum of the

There are 20 consecutive even numbers. How much bigger is the sum of the larger 10 ones than the sum of the smaller ones?

2 months ago

Solution 1

Guest Guest #5493097
2 months ago
You can look on the app Socratic to help you.

Solution 2

Guest Guest #5493098
2 months ago

Answer:

The answer is 200

Step-by-step explanation:

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2 interior angles of 75 degrees.

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180-150=30

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Step-by-step explanation:

In ΔRST, the measure of ∠T=90°, ST = 71 feet, and RS = 94 feet. Find the measure of ∠S to the nearest tenth of a degree.

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What is the base for the follwing problem log100=2​
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Combining Like Terms 1. 10Z-4B+3Z+16B-Z 2. -5M-3P+5P+12P 3. 12P-4M+8P-3M-2P 4. 10B-5M-4B+8B-4M 5. 4Z+3Z-6Z+B 6. 7B+3X-8B+6X (By the way Those letters without a number by it, is 1. So EX: 4Z+5+Z is 5Z+5 ) ​
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Step-by-step explanation:

1. 10Z–4B+3Z+16B–Z = 10Z+3Z–Z+16B–4B

= 12Z+12B = 12(Z+B)

2. –5M–3P+5P+12P = 12P+5P–3P–5M = 14P–5M

3. 12P–4M+8P–3M–2P = 12P+8P–2P–4M–3M

= 18P–7M

4. 10B–5M–4B+8B–4M = 10B+8B–4B–5M–4M

= 14B–9M

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Question
2 divided by what equals 4151 pls i only have an hour
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Step-by-step explanation:

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Question
HELP PLEASE! Write a quadratic function that passes through the point (-1,9), has an axis of symmetry of x=-3 and a minimum value of 7.
Solution 1

Answer:

y = \frac{1}{2}x^{2} - 3x + 11.5

Step-by-step explanation:

Vertex Form of a quadratic equation;

y = a( x - h )^{2} + k

Vertex of the parabolas (h, k)

The vertex of the parabola is either the minimum or maximum of the parabola. The axis of symmetry goes through the x-coordinate of the vertex, hence h = -3. The minimum of the parabola is the y-coordinate of the vertex, so k= 7. Now substitute it into the formula;

y = a ( x + 3 ) ^{2} + 7

Now substitute in the given point; ( -1, 9) and solve for a;

9 = a( (-1 ) + 3)^2 + 7\\9 = a (2)^{2} + 7\\9 = 4a + 7\\-7 -7\\2 = 4a\\\frac{1}{2} = a\\

Hence the equation in vertex form is;

y = \frac{1}{2}(x - 3)^{2} + 7

In standard form it is;

y = \frac{1}{2}x^{2} - 3x + 11.5

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