Two times the least of three consecutive odd integers exceeds three times the greatest by 15.

Let the three consecutive odd integers be $x$, $x+2$ and $x+4$. Then, the least of them is $x$ and the greatest of them is $x+4$.

Translating the given condition into an equation,

$2x-3\left(x+4\right)=15$

Solving,

$2x-3\left(x+4\right)=15$  (Given equation)

$2x-3x-12=15$  (Distributive property)

$-x-12=15$  (Simplify)

$-x-12+12=15+12$  (Add 12 to both sides)

$-x=27$  (Simplify)

$\frac{-x}{-1}=\frac{27}{-1}$  (Divide both sides by $-1$)

$x=-27$  (Simplify)

So, $x=-27$ is the solution of the given equation.

The required integers were assumed to be $x$, $x+2$ and $x+4$. It was obtained that for the given condition to be satisfied, $x=-27$.

Then, the required integers are $\mathbf{-}\mathbf{27}\mathbf{,}\mathbf{ }\mathbf{-}\mathbf{25}$ and $\mathbf{-}\mathbf{23}$.