How do you solve 2/5x+1/4=-7/1025x+14=−710 by clearing the fractions?
2 Answers
Explanation:
If you have an equation with fractions, you can get rid of the denominators by multiplying each term by the LCM of the denominators. IN this case it is
Explanation:
First note that
2/5x=(2x)/525x=2x5 To 'clear' the fractions we require to multiply ALL terms on both sides of the equation by the
color(blue)"lowest common multiple"lowest common multiple (LCM ) of the denominators 5 , 4 and 10.#the LCM of 5 , 4 and 10 is 20
so multiply all terms by 20
(cancel(20)^4xx(2x)/cancel(5)^1)+(cancel(20)^5xx1/cancel(4)^1)=cancel(20)^2xx(-7)/cancel(10)^1
rArr(4xx2x)+(5xx1)=(2xx-7)larr" no fractions"
rArr8x+5=-14 subtract 5 from both sides.
8xcancel(+5)cancel(-5)=-14-5
rArr8x=-19 To solve for x, divide both sides by 8
(cancel(8) x)/cancel(8)=(-19)/8
rArrx=-19/8" is the solution"
color(blue)"As a check" Substitute
x=-19/8 into the left side and if it is a solution then it should equal the right side.
"left side " =(2/5xx-19/8)+1/4=-38/40+1/4
=-38/40+10/40=-28/40=-7/10color(white)(xx)✔︎
rArrx=-19/8" is the solution"
