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4 years ago

6m+100=529 What is the answer for this problem?

Mathematics

1 answer:

True [87]4 years ago

7 0

$\tt{Hey$ $\tt{there!$

$\tt{6m+100=529$

$\tt{Subtract$ $\tt{100$ $\tt{from$ $\tt{both$ $\tt{sides:$

$\tt{6m+100-100=529-100$

$\tt{6m=429$

$\tt{Divide$ $\tt{both$ $\tt{sides$ $\tt{by$ $\tt{6:$

$\tt{\frac{6m}{6}=\frac{426}{6}$

$\tt{Simplify$ $\tt{426/6:$

$\tt{\frac{143}{2}$

$\tt{Hope$ $\tt{this$ $\tt{helps!$

$\boxed{\tt{-TestedHyperr}}$

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We are given Elena’s bedroom door's width = 0.8 m.

Also the scale drawing is in the ratio of 1 to 50 that is 1/50.

<em>In order to find the width of scale drawing, we need to multiply original width of the door by 1/50.</em>

If we multiply 0.8 by 1/50, we get

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Answer:

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Step-by-step explanation:

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We will use the x and y values from each of our 3 points to find a, b, and c. Filling in the x and y values from each point:

First point (-5, 0):

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Second point (9, 0):

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0 = 81a + 9b + c

Third point (8, -39):

$-39=a(8)^2+b(8)+c$ and

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Use the elimination method of solving systems on the first 2 equations to eliminate the c. Multiply the first equation by -1 to get:

-25a + 5b - c = 0

81a + 9b + c = 0

When the c's cancel out you're left with

56a + 14b = 0

Now use the second and third equations and elimination to get rid of the c's. Multiply the second equation by -1 to get:

-81a - 9b - c = 0

64a + 8b + c = -39

When the c's cancel out you're left with

-17a - 1b = -39

Between those 2 bolded equations, eliminate the b's. Do this by multiplying the second of the 2 by 14 to get:

56a + 14b = 0

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When the b's cancel out you're left with

-182a = -546 and

a = 3

Use this value of a to back substitute to find b:

56a + 14b = 0 so 56(3) + 14b = 0 gives you

168 + 14b = 0 and 14b = -168 so

b = -12

Now back sub in a and b to find c:

0 = 25a - 5b + c gives you

0 = 75+ 60 + c so

0 = 135 + c and

c = -135

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$y=3x^2-12x-135$

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In which $C_{n,x}$ is the number of different combinatios of x objects from a set of n elements, given by the following formula.

$C_{n,x} = \frac{n!}{x!(n-x)!}$

And $\pi$ is the probability of X happening.

In this problem, we have that:

It is reported in about one child in every 500, so $\pi = \frac{1}{500} = 0.002$ .

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That is P(X = 0)

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