Complex numbers can serve as entries in a matrix just as well as real numbers.Compute the expressions in Problems 51-53

Tabansi

Tabansi

Answered question

2021-09-05

Complex numbers can serve as entries in a matrix just as well as real numbers.Compute the expressions in Problems 51-53 , where
A=[1+i2i223i] and B=[1i2i1+i]
51.A+2B
52.AB
53. BA

Answer & Explanation

Elberte

Elberte

Skilled2021-09-06Added 95 answers

Step 1
Given:
A=[1+i2i223i] and B=[1i2i1+i]
Step 2
A=[1+i2i223i] and B=[1i2i1+i] 51.A+2B
[1+i2i223i]+2[1i2i1+i]
=[1+i2i223i]+[22i4i2+2i]
=[1+i+22i2i2+4i23i+2+2i]
=[3+i02+4i4i]
Step 3
52.AB=[1+i2i223i][1i2i1+i]
=[(1+i)(1)+2i×2i(1+i)+2i(1+i)2×1+(23i)×2i2×(i)+(23i)(1+i)]
=[i3i(1+i)2+2i(23i)2i+(23i)(1+i)]
53. BA=[1i2i1+i][1+i2i223i]
=[1(1+i)+(i)(2)1(2i)+(i)(23i)2i(1+i)+(1+i)×22i×2i+(1+i)(23i)]
=[1ii(23i)+2i2i+2i2+2+2i4i2+(1+i)(23i)]

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