Question

Verify 5(2x+5)-2(x+1)=0​

Answer 1

Answer:

Hence, it is verified that both sides are equal.

Step-by-step explanation:

As per the data given in the question,

We have to find the value of the equation and also verify it,

The given equation,

$5(2x+5)-2(x+1)=0$

Now distributing the term we get

=> $(10x+25)-(2x+2)=0$

Subtract the numbers, we get

=> $10x + 23 - 2x = 0$

Combine the like terms,

=> $8x + 23= 0$

Subtract both sides by $23$,

=> $8x + 23-23= 0-23$

=> $8x = - 23$

Now, divide both sides by $8$,

=> $x = -\frac{23}{8}$

Verifying,

Now, plug the value of x in the equation:

=> $5[2(-\frac{23}{8})+5]-2[(-\frac{23}{8})+1]=0$

Simplifying it further,

=> $5[(-\frac{3}{4})]-2[(-\frac{15}{8})]=0$

=> 0 = 0

LHS = RHS