Answer: " x = 7 " .
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Step-by-step explanation:
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Given:
x + (2/7)x = 9 ; Solve for "x" ;
Note:
Start by simplifying the "left hand side of the equation:
[tex]x +\frac{2}{7}x =1x +\frac{2}{7}x =[/tex][tex](1\frac{2}{7}) x =\frac{(7*1)+2}{7}x = \frac{(7+2)}{7}x = \frac{9}{7}x[/tex] ;
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Now, rewrite the equation:
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[tex]\frac{9}{7}x =9[/tex] ; Solve for "x" ;
We now multiply each side of the equation by "7" ;
to get rid of the "denominator" within the "fraction value"
on the "left-hand side" of the equation:
[tex]7 *\frac{9}{7}x = 9 * 7[/tex] ;
On the "left-hand side" of the equation:
The "7's" cancel out to "1's" ; since "7÷7 = 1 " ;
And we are left with "9x" on the "left-hand side" of the equation.
On the "right-hand side" on the equation; we find that: "9 * 7 = 63 ."
So; we can rewrite the equation:
9x = 63 ;
To solve for "x" ; we divide each side of the equation by: "9" ;
to isolate "x" on one side of the equation;
& to solve for "x" ;
9x / 9 = 63 / 9 ;
to get:
x = 7 .
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Hope this answer—and explanation—is helpful!
Best wishes to you!
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