The solution of the equation $$m - 2 = 3$$ is $$m = 5 .$$

A number, when increased by $$21$$, gives $$30$$. The algebraic form for the statement is $$x + 21 = 30$$.

The algebraic form of twice of a number when decreased by $$9$$ gives $$11$$ is $$(2 + x) - 9 = 11$$.

$$x$$ subtracted from $$10$$ equals $$3$$ can be written as $$x - 10 = 3$$.

$$\frac{18}{x} = 6$$ is an algebraic form for the statement, $$18$$ divided by $$x$$ gives 6.

One-fourth of a number when added to two-sevenths of the same number gives $$135$$. It can be written as $$\frac{1}{4}x + \frac{2}{7}x = 135$$.

The sum of two consecutive numbers is $$21$$. The algebraic form for the statement is $$x + (x + 1) = 21$$.

$$15 - x = 6$$ means $$15$$ subtracted from $$x$$ gives $$6$$.

If $$10 - \frac{x}{3} = 30$$, then $$x = -40$$.

If $$m - 8 = \frac{m}{5}$$, then what is the value of $$m$$?

What is the value of $$p$$ if $$2p + 6 = 8$$?

What is the value of $$x$$ if $$x - 3 = 15$$?

What is the value of $$x$$ if $$\frac{x}{7} + 2 = 3\frac{1}{2}$$?

If $$z + 3 = 2(5 + z)$$, then what is the value of $$z$$?

For what value of $$y$$, the linear equation $$4(y - 4) = 3 (y + 6)$$ is true?

For what value of $$z$$, the linear equation $$\frac{-2}{3}z = \frac{8}{9}$$ is true?

If $$\frac{1}{3}(z + 5) = 2\frac{1}{3}$$, then what is the value of $$z$$?

What is the value of $$x$$ if $$3x - x + 5 = 10$$?