Question

2x-1/2=3 verify and solve​

Answer 1

Answer:

2 × (-1/2) = 3

-2 ≠ 3

I HOPE THIS IS HELPFULL.

Answer 2

$\large {\underline {\underline {\sf {Question}}}}$

$\odot \tt 2x - \dfrac{1}{2} = 3$ verify and solve ?

$\large {\underline {\underline {\sf {\pink {How \: to \: solve?}}}}}$

• By using vertically multiplication and division solve this sum and if lcm needed then solve that also .
• Then the value of x will come after coming that value pit in the x and solve it it will be verified
• ☀️So, lets start.

$\large {\underline {\underline {\sf {\blue {Answer}}}}}$

$\implies \tt 2x - \dfrac{1}{2} = 3 \\ \\ \implies \tt taking \: \:LCM \\ \\ \implies \tt \dfrac{4x - 1}{2} = 3 \\ \\ \implies \tt \dfrac{4x - 1}{\cancel{2}} = {\cancel 3} \\ \\ \implies \tt 4x - 1 = 6 \\ \\ \implies \tt x = \dfrac{6 + 1}{4} \\ \\ \implies \tt x = \dfrac{7}{4}$

${\boxed {\boxed{\sf {Verification}}}}$

$\implies \tt 2(\dfrac{7}{4}) - \dfrac{1}{2} = 3 \\ \\ \implies \tt \dfrac{7}{2} - \dfrac{1}{2} = 3 \\ \\ \implies \tt \dfrac{7 - 1}{2} = 3 \\ \\ \implies \tt 6 = 6$

Hence, now it is verified.

$\large {\underline {\underline {\sf {\purple {Answer}}}}}$

$\large {\boxed {\boxed {\tt {\green {Answer : x = \dfrac{7}{4}}}}}}$

☃️ Hence we are done with the problem.