Evaluate the integrals \int_{0}^{1}[t^{3}i+7j+(t+1)k]dt

Armorikam

Armorikam

Answered question

2021-07-19

Evaluate the integrals
01[t3i+7j+(t+1)k]dt

Answer & Explanation

hajavaF

hajavaF

Skilled2021-07-20Added 90 answers

Step 1
To Determine: Evaluate the integrals
Given: we have
01[t3i+7j+(t+1)k]dt
Explanation: we have an integral
01[t3i+7j+(t+1)k]dt
we know that
[f(t)i+g(t)j+h(t)k]dt=(f(t)dt)i+(g(t)dt)j+(h(t)dt)k
so we can write the integral as
01[t3i+7j+(t+1)k]dt=(01t3dt)i+(017dt)j+(01(t+1)dt)k
Step 2
01[t3i+7j+(t+1)k]dt=(01t3dt)i+(017dt)j+(01(t+1)dt)k
=[t44]01i+7[t]01j+[t22+t]01k
=(1404)i+7(10)j+[12+10]k

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