Solution: Indefinite Integrals #3
Solution: Indefinite Integrals #3
Evaluate:
[latex]\Large{\int(e^t + sin(t) - 1)dt}[/latex]
[latex]\Large{\int(e^t + sin(t) - 1)dt}[/latex]
Step 1:
We can first apply the integration to each term as follows:
[latex]\large{\int(e^t + \sin(t) – 1)dt = \int(e^t)dt +\int(\sin(t))dt – \int(1)dt}[/latex]
Step 2:
Now, we can use our knowledge of common integrals to evaluate each integral individually, as shown:
[latex]\large{\int(e^t)dt = e^t}[/latex]
[latex]\large{\int(\sin(t))dt = -\cos(t)}[/latex]
[latex]\large{\int(1)dt = t }[/latex]
Step 3:
Now, combining everything, we have:
[latex]\large{\int(e^t + \sin(t) – 1)dt = e^t – \cos(t) – t + C}[/latex]
Solution Complete!
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Solution: Indefinite Integrals #3
Evaluate:
[latex]\Large{\int(e^t + sin(t) - 1)dt}[/latex]
[latex]\Large{\int(e^t + sin(t) - 1)dt}[/latex]
Step 1:
We can first apply the integration to each term as follows:
[latex]\large{\int(e^t + \sin(t) – 1)dt}[/latex]
[latex]\large{ = \int(e^t)dt +\int(\sin(t))dt – \int(1)dt}[/latex]
Step 2:
Now, we can use our knowledge of common integrals to evaluate each integral individually, as shown:
[latex]\large{\int(e^t)dt = e^t}[/latex]
[latex]\large{\int(\sin(t))dt = -\cos(t)}[/latex]
[latex]\large{\int(1)dt = t }[/latex]
Step 3:
Now, combining everything, we have:
[latex]\large{\int(e^t + \sin(t) – 1)dt }[/latex]
[latex] \large{= e^t – \cos(t) – t + C}[/latex]
Solution Complete!
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