$\begin{array}{l}x=0 . \overline{7} \ x \cdot 10^1=0 . \overline{7} \cdot 10^1 \ 10 x=5 \ 10 x-x=\overline{7}-0.7\end{array}$

Question

LucasMatthewHarris · Answer

The question is about converting a repeating decimal to a fraction. 
 Let's break down the process of converting the repeating decimal x = 0. 7 into a fraction. 
 
 Define the repeating decimal: 
 Start by setting the repeating decimal equal to a variable. Let's say x = 0. 7 . 
 
 Express the repeating part using multiplication: 
 Since 0. 7 repeats every one decimal place, multiply both sides of the equation by 10: 
 10 x = 7. 7 
 
 Set up the subtraction to eliminate the repeating part: 
 Now, subtract the original equation from this new equation: 
 10 x − x = 7. 7 − 0. 7 
 Simplifying, we get: 
 9 x = 7 
 
 Solve for x : 
 Divide both sides by 9 to get: 
 x = 9 7 ​

So, the decimal 0. 7 is equal to the fraction 9 7 ​ . This process effectively converts the given repeating decimal into a fraction by eliminating the repeating part through balancing equations and operations. This concept is commonly dealt with in high school algebra.

$\begin{array}{l}x=0 . \overline{7} \\ x \cdot 10^1=0 . \overline{7} \cdot 10^1 \\ 10 x=5 \\ 10 x-x=\overline{7}-0.7\end{array}$

Answer (1)

$\begin{array}{l}x=0 . \overline{7} \\ x \cdot 10^1=0 . \overline{7} \cdot 10^1 \\ 10 x=5 \\ 10 x-x=\overline{7}-0.7\end{array}$

Answer (1)

Related Questions in Mathematics

[Answered] Select the correct answer. Which equation is equivalent to the given equation? [tex]$x^2-6 x=8$[/tex] A. [tex]$(x-6)^2=44$[/tex] B. [tex]$(x-3)^2=17$[/tex] C. [tex]$(x-6)^2=20$[/tex] D. [tex]$(x-3)^2=14$[/tex]

[Answered] Which phrase best describes the translation from the graph [tex]y=6 x^2[/tex] to the graph of [tex]y=6(x+1)^2[/tex]? A. 6 units left B. 6 units right C. 1 unit left D. 1 unit right

[Answered] What expression is equivalent to [tex]$\left(5 z^2+3 z+2\right)^2$[/tex] ? A. [tex]$5 z^4+3 z^2+4$[/tex] B. [tex]$5 z^4+9 z^2+4$[/tex] C. [tex]$25 z^4+30 z^3+19 z^2+12 z+4$[/tex] D. [tex]$25 z^4+30 z^3+29 z^2+12 z+4$[/tex]

[Answered] The graph of [tex]y=\frac{5}{4} x+1[/tex] is shown below. The coordinate ([tex]0, y[/tex]) is a solution of the equation. Given the [tex]x[/tex]-value of 0, what is the value of the [tex]y[/tex]-coordinate for the coordinate ([tex]0, y[/tex])? [tex]y=[/tex] [blank]

[Answered] If [tex]f(-2)=0[/tex], what are all the factors of the function [tex]f(x)=x^3-2 x^2-68 x-120[/tex]? Use the Remainder Theorem. A. [tex](x+2)(x+60)[/tex] B. [tex](x-2)(x-60)[/tex] C. [tex](x-10)(x+2)(x+6)[/tex] D. [tex](x+10)(x-2)(x-6)[/tex]