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Look at the diagram.
Which equation can be used to solve for
x ?

15 x+75=180

10 x+80=180

15 x=75

10 x+5=75
Solve for
x.

x=

Look at the diagram. $\newline$ Which equation can be used to solve for $x$ ? $\newline$ $15 x+75=180$ $\newline$ $10 x+80=180$ $\newline$ $15 x=75$ $\newline$ $10 x+5=75$ $\newline$ Solve for $x$ . $\newline$ $x=$

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Evaluate recursive formulas for sequences

Full solution

Q. Look at the diagram.

\newline

Which equation can be used to solve for

x

?

\newline

15 x+75=180

\newline

10 x+80=180

\newline

15 x=75

\newline

10 x+5=75

\newline

Solve for

x

.

\newline

x=

Identify Equation: First, we need to find the equation that correctly represents the relationship to solve for $x$ . We can eliminate the equations that don't equal $180$ since the other side of the equation is $180$ .
Verify Equation: The equation $15x + 75 = 180$ seems to be the correct one because if we subtract $75$ from both sides, we'll get $15x = 105$ , which makes sense.
Solve for x: Now let's solve for x. Subtract $75$ from both sides of the equation $15x + 75 = 180$ . $\newline$ $15x + 75 - 75 = 180 - 75$ $\newline$ $15x = 105$
Isolate $x$ : Next, divide both sides by $15$ to isolate $x$ . $\frac{15x}{15} = \frac{105}{15}$ $x = 7$

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