Question

Find the value of x in the following

(3x+18) 93 =180
in lines and angles lesson
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Answer 1

Answer:

$(3x + 18)93 = 180$

$3x + 18 = \frac{180}{93}$

$3x = \frac{180}{93} - 18 = \frac{180 - 3240}{93} = \frac{ - 3060}{93}$

$x = \frac{ - 3060}{93 \times 3}$

$x = \frac{ - 1020}{93} = 10 \frac{90}{93}$

Answer 2

Answer:

=> The value of x is $-\frac{166}{31}$.

Step-by-step explanation:

Given that:-

$(3x+18) 93 =180$

To find:- The value of the expression,

To solve this expression, we have to use the transposition method:

As we have,

=> $(3x+18) 93 =180$

Distributing the terms, we get

=> $2 7 9 x + 1 6 7 4 = 1 8 0$

Now subtract both sides by $1674$,

=> $2 7 9 x + 1 6 7 4- 1 6 7 4 = 1 8 0- 1 6 7 4$

=> $279x = -1494$

Divide both sides by $279x$, we get

=> $x = - \frac{1494}{279}$

Canceling the terms, we get

=> $x = -\frac{166}{31}$

Hence, the required solution is $-\frac{166}{31}$.