✒️[tex]\large{\mathcal{ANSWER}}[/tex]
[tex]======================[/tex]
- The correct value of 'x' which, corresponding to this equation of the first degree, has the answer = 87.
To solve this equation of the first degree, we will move the digit 7 to the right side of the equality by adding, then we will isolate 'x', and we will multiply the denominator number of the fraction by the second term of the equality , being, the right side of the equation.
- Second member » right side
- First member » left side
- a/b → "a" numerator, "b" denominator.
* Being the equation indicated in this question = x/3 -7 = 22 calculate this sentence, to find the final result of the unknown:
[tex] \frac{x}{7} - 7 = 22[/tex]
[tex] \frac{x}{3} = 22 + 7[/tex]
[tex] \frac{x}{3} = 29[/tex]
[tex]x = 3 \times 29[/tex]
[tex] \: \boxed{x = 87} [/tex]
What is the value of 'x' in this equation?
- ✈️️The correct value of 'x' in this equation is respectively = 87.✅
[tex] \: \boxed{x = 87} [/tex]
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