Answer :
|x-5| + 7 = 13 is equal to x= -11 and x = 1.
[tex]|x-5|+7=13[/tex]
Subtract 7 from both sides
[tex]|x-5|+7-7=13-7[/tex]
Simplify
[tex]|x-5|=6[/tex]
Apply absolute rule: If [tex]$|u|=a, a > 0$[/tex] then [tex]$u=a$[/tex] or [tex]$u=-a$[/tex] [tex]$x-5=-6$[/tex] or [tex]$x-5=6$[/tex]
[tex]$x-5=-6 \text { or } x-5=6$[/tex]
[tex]$x=-1 \text { or } x=11$[/tex]
Making something simpler is making it less intricate or crowded. When you describe a complex mathematical idea to a youngster in words they can easily comprehend, you are simplifying. When you eliminate many of the tasks that were keeping you occupied and stressed out, you have simplified.
Making something simpler refers to making it simpler to accomplish or comprehend. Therefore, when we reduce or simplify a fraction, we aim for maximum simplicity. In order to do this, we divide both the numerator and the denominator by the biggest integer that can be divided precisely into both numbers.
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