question for the definite integral given below, identify the integrand, the limits of integration, and the…

question for the definite integral given below, identify the integrand, the limits of integration, and the variable of integration. ∫-4π to -4e -6ln(-3t)dt provide your answer below: the integrand is , the lower bound is , the upper bound is , and the variable of integration is
Answer
Explanation:
Step1: Identify integrand
The function being integrated is the integrand. Here it is $- 6\ln(-3t)$.
Step2: Identify lower - bound
The lower value of the interval of integration is the lower - bound. Here it is $-4\pi$.
Step3: Identify upper - bound
The higher value of the interval of integration is the upper - bound. Here it is $-4e$.
Step4: Identify variable of integration
The variable next to $dt$ is the variable of integration. Here it is $t$.
Answer:
The integrand is $-6\ln(-3t)$, the lower bound is $-4\pi$, the upper bound is $-4e$, and the variable of integration is $t$.