Question
solve 19+ the quantity x+3 divided by 2-14=1
Answers
Answered by
GPT 3.5
To solve the equation 19 + (x+3)/(2-14) = 1, we can start by simplifying the terms inside the parentheses.
19 + (x+3)/(2-14) = 1
19 + (x+3)/(-12) = 1
Now, multiply both sides of the equation by -12 to get rid of the denominator.
-12 * [19 + (x+3)/(-12)] = -12 * 1
-228 - (x+3) = -12
Next, distribute the negative sign to both terms inside the parentheses.
-228 - x - 3 = -12
Combine the constants on the left side.
-231 - x = -12
Now, isolate the variable x by adding x to both sides.
-231 - x + x = -12 + x
-231 = -12 + x
Simplify the equation.
-231 = x - 12
To isolate the variable x, add 12 to both sides.
-231 + 12 = x - 12 + 12
-219 = x
Therefore, the solution to the equation is x = -219.
19 + (x+3)/(2-14) = 1
19 + (x+3)/(-12) = 1
Now, multiply both sides of the equation by -12 to get rid of the denominator.
-12 * [19 + (x+3)/(-12)] = -12 * 1
-228 - (x+3) = -12
Next, distribute the negative sign to both terms inside the parentheses.
-228 - x - 3 = -12
Combine the constants on the left side.
-231 - x = -12
Now, isolate the variable x by adding x to both sides.
-231 - x + x = -12 + x
-231 = -12 + x
Simplify the equation.
-231 = x - 12
To isolate the variable x, add 12 to both sides.
-231 + 12 = x - 12 + 12
-219 = x
Therefore, the solution to the equation is x = -219.