Find the value of |b - a + 1| - |a - b -3| for a < 0 and ab < 0.

Simplify |a+1| + |a-1| for    -1 <= a <= 0 

It is given |a| = 7, |b| = 5 and |a - b| = b - a.

Find the value of a + b

Simplify |a+3| + |a-3| if the value of a is given as   -3 <= a <= 0.

It is given |a| = 2, |b| = 3, |c| = 4, a > b >c. Find the value of a + b -c.

Solve \(\dfrac{13}{6}\left(x-3\right)+\dfrac{4}{3}\left(3-x\right)=\dfrac{7}{6}\left(x-3\right)+8\)

if (a+1) satisfies 2(x+1) = 3(x-1), find the solution to 2[3(2+x)-2(a-x)]=4a

Find the smallest possible value of a, where a is a whole number, in

\(\dfrac{33x}{2}-a=\)\(\dfrac{5x}{6}+184\)

Find the value of m if x = 3 satisfies the equation

\(\dfrac{m-x}{3}\)+\(\dfrac{3x-6}{4}\)=\(\dfrac{4x+5}{12}\)

it is given 3 - a = 4 - b = 2, c = 499 . Also, a+b+c = 2008m. Find the value of m

if x = \(\dfrac{1}{2}\)statisfies the equation 4x - 3a = 0, find the value of a.