1. The problem is to solve the integral using improper integrals. 2. Improper integrals are used when the interval of integration is infinite or the integrand has an infinite discontinuity. 3. We express the integral as a limit: $$\int_a^b f(x) dx = \lim_{t \to b^-} \int_a^t f(x) dx$$ if $b$ is infinite or the integrand is unbounded at $b$. 4. Evaluate the integral by computing the definite integral first, then take the limit. 5. Substitute the limits and simplify the expression. 6. Calculate the limit to find the value of the improper integral. 7. This method ensures convergence or divergence is properly handled. Final answer depends on the specific integral provided, which was not included in the message.