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3 years ago

Which number is equal to 63?

Mathematics

1 answer:

Andre45 [30]3 years ago

5 0

Answer:

63 = 1 x 63, 3 x 21, or 7 x 9. Factors of 63: 1, 3, 7, 9, 21, 63. Prime factorization: 63 = 3 x 3 x 7, which can also be written 63 = 3² x 7.

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174 ÷ 6 Show work help

fredd [130]

The answer is 29, because i did long division on a paper i can not show the work.

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3 years ago

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Midpoint of (-10,3) and (-7,-10)

Setler [38]

The midpoint would be (-8.5,-3.5))

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3 years ago

Solve the equations for the given variable. Then place the equations in the table under the correct solution

vekshin1

Placing the equations under the correct solution, we get

x = 3 x ≠ 3

-14x = -42 -5 + x = -9

$-\frac{3}{5} +x = \frac{12}{5}$ $\frac{x}{3} =9$

$\frac{x}{4} =\frac{6}{8}$

x -5 = -2

<h3>Solving Linear Equations </h3>

From the question, we are to place the equations under the correct solution

To do this, we will solve the equations one after the other

-14x = -42

x = -42/-14

x = 3

-5 + x = -9

x = -9 + 5

x = -4

∴ x ≠ 3

$-\frac{3}{5} +x = \frac{12}{5}$

$x = \frac{12}{5} +\frac{3}{5}$

$x = \frac{12+3}{5}$

$x = \frac{15}{5}$

x = 3

$\frac{x}{4} =\frac{6}{8}$

$x=\frac{6\times 4}{8}$

$x=\frac{24}{8}$

x = 3

$\frac{x}{3} =9$

x = 3 × 9

x = 27

∴ x ≠ 3

x -5 = -2

x = -2 + 5

x = 3

Hence, placing the equations under the correct solution, we get

x = 3 x ≠ 3

-14x = -42 -5 + x = -9

$-\frac{3}{5} +x = \frac{12}{5}$ $\frac{x}{3} =9$

$\frac{x}{4} =\frac{6}{8}$

x -5 = -2

Learn more on Solving linear equations here: brainly.com/question/13204213

#SPJ1

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2 years ago

The average weight, in ounces, of a baby for the first six months of life can be estimated using the equation y = 6x + 120, wher

Vlad1618 [11]

Answer:

I believe its D, if not C

Step-by-step explanation:

Since 6x would be something multiplying, the weeks that would be the amount added every week. 120 would the amount it weighs when its born.

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3 years ago

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PLEASE HELP MATH QUESTION !!! Explain!

butalik [34]

When we say two quantities $x$ and $y$ are proportional to one another, there are two ways we could mean this.

- If $x$ is *directly* proportional to $y$ , then we mean that as $x$ changes, $y$ changes in the same direction. In other words, if $x$ is in/decreased, then $y$ also in/decreases. The rate of in/decrease doesn't have to be one-to-one; for example, we could have $x$ increase by 1 unit while $y$ would proportionally increase by 5 units. In this case, we'd have $y=5x$ .

- On the other hand, if $x$ is *inversely* proportional to $y$ , then a change in $x$ results in a change in $y$ that goes in the opposite direction. A common example involves taking a rectangle of constant area and adjusting the width $x$ and length $y$ . If the rectangle has an area of 5 square units, then we could have $x=5$ and $y=1$ , or we could have $x=4$ and $y=\dfrac54$ , or $x=3$ and $y=\dfrac53$ , or any combination of $x$ and $y$ such that $xy=5$ is satisfied.

In both cases, we call 5 the "constant of proportionality".

On to your exercises:

(1a) Looks like $a$ stands for number of apples. Then we're told that the cost $c=2.3a$ , which means that for every apple, the cost increases by 2.3 dollars. So the constant of proportionality is 2.3. In the language of proportionality, we could then say that the cost of apples is directly proportional to the number of apples by a factor of 2.3.

(1b) 5.4

(1c) 12.5

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3 years ago