11/24-y=5/16x-6/7=9/28​

It appears that you have an equation with multiple variables and constants. To solve for one of the variables, we need to isolate it. Let's solve for 'x' in the equation:

$11/24 - y = 5/16x - 6/7 = 9/28$

First, we'll simplify the equation:

$11/24 - y = 5/16x - 6/7$

Now, let's isolate 'x':

$5/16x = 11/24 - y + 6/7$

To add the fractions on the right side, we need a common denominator, which in this case is 168 (the least common multiple of 24, 16, and 7).

So, we'll rewrite the fractions with a common denominator of 168:

$(11/24) * (7/7) - (y * 24/24) + (6/7) * (24/24) = (5/16x) * (21/21)$

Now, calculate the values on the right side:

$(77/168) - (24y/168) + (144/168) = (105/336x)$

Now, combine the fractions on the right side:

$(77 - 24y + 144)/168 = (105/336x)$

Combine the numerators on the left side:

$(221 - 24y)/168 = (105/336x)$

Now, we want to isolate 'x,' so let's multiply both sides by 336 to get rid of the fraction on the right side:

$(221 - 24y)/168 * 336 = (105/336x) * 336$

The right side simplifies, and the left side becomes:

$221 - 24y = 105x$

Now, isolate 'x' by dividing both sides by 105:

$(221 - 24y)/105 = (105x)/105$

$x = (221 - 24y)/105$

So, the solution for 'x' in terms of 'y' is:

$x = (221 - 24y)/105$

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