Answered

Join the growing community of curious minds on IDNLearn.com. Our experts are ready to provide in-depth answers and practical solutions to any questions you may have.

Please anyone help!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
I would really appreciate it

Please Anyone Help I Would Really Appreciate It class=

Sagot :

LammettHashidn

If [tex]i = \sqrt{-1}[/tex], then [tex]i^2 = -1[/tex], [tex]i^3 = -i[/tex], and [tex]i^4 = 1[/tex]. For larger integer powers of i, the cycle repeats:

[tex]i^5 = i^4\cdot i^1 = i \\\\ i^6 = i^4\cdot i^2 = -1 \\\\ i^7 = i^4\cdot i^3 = -i \\\\ i^8 = i^4\cdot i^4 = 1[/tex]

and so on.

Then

(1)

[tex]i^{8n} = i^{4\cdot2n} = \left(i^4\right)^{2n} = 1^{2n} = 1[/tex]

(2)

[tex]i^{4n+42} = i^{4n+40+2} = i^{4n+40}\cdot i^2 = \left(i^4\right)^{n+10}\cdot i^2 = 1^{n+10}\cdot i^2 = -1[/tex]

(3)

[tex]i^{12n+3} = i^{12n}\cdot i^3 = \left(i^4\right)^{3n} \cdot i^3 = 1^{3n}\cdot i^3 = -i[/tex]

(4)

[tex]i^{8n-3} = i^{8n}\cdot i^{-3} = \left(i^4\right)^{2n}\cdot \dfrac1{i^3} = \dfrac{1^{2n}}{i^3} = \dfrac1{i^3} = -\dfrac1i = i[/tex]

Thank you for contributing to our discussion. Don't forget to check back for new answers. Keep asking, answering, and sharing useful information. IDNLearn.com is your source for precise answers. Thank you for visiting, and we look forward to helping you again soon.