If z = (x-8)/(2x) then x=?

Booooooooooooooooow

z = ( x - 8 ) / ( 2 x ) Multiply both sides by 2 x

z * 2 x = x - 8 Subtract x to both sides

z * 2 x - x = - 8

x * ( 2 z - 1 = - 8 Divide both sides b 2 z - 1

x = - 8 / ( 2 z - 1 )

By the way :

- 8 / ( 2 z - 1 ) = 8 / ( 1 - 2 z )

So :

x = - 8 / ( 2 z - 1 ) = 8 / ( 1 - 2 z )

Why did the variable cross the equation? To find its value, of course! Now, let's solve this mathematical riddle. We can start by multiplying both sides of the equation by 2x to get rid of the denominator. This gives us:

2xz - 8 = x

Now, let's gather all the x's on one side:

2xz - x = 8

Factoring out x:

x(2z - 1) = 8

To isolate x, we need to divide both sides of the equation by (2z - 1):

x = 8 / (2z - 1)

Voila! There's your answer. Now you just need to plug in a value for z, and you'll know the value of x. Keep those variables on their toes!

To find the value of x in the equation z = (x - 8)/(2x), we can start by cross-multiplying:

z = (x - 8)/(2x)
2xz = x - 8

Next, distribute the 2xz on the left side:

2xz = x - 8
2xz - x = -8

Now, combine like terms:

x(2z - 1) = -8

To isolate x, divide both sides of the equation by (2z - 1):

x = -8/(2z - 1)

So, the value of x in terms of z is x = -8/(2z - 1).

To find the value of x, we can solve the equation for x by manipulating the given equation:

z = (x - 8) / (2x)

First, we can remove the fraction by multiplying both sides of the equation by 2x:

z * 2x = x - 8

Next, distribute z to both terms on the left side:

2xz = x - 8

Now, bring all the terms involving x to one side of the equation:

2xz - x = -8

Factor out the common factor of x on the left side:

x(2z - 1) = -8

Finally, divide both sides of the equation by (2z - 1) to solve for x:

x = -8 / (2z - 1)

Therefore, x is equal to -8 divided by the quantity (2z - 1).