1
Question
Let z=−1+√3i2, where i=√−1, and r, s ϵ {1, 2, 3}. Let P=[(−z)rz2sz2szr] and I be the identity matrix of order 2. Then, the total number of ordered pairs (r, s) for which P2 = -I is ___
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Solution
Here, z=−1+i√32=ω [From cube root of unity]
∵ P=[(−ω)rω2sω2sωr]
P2=[(−ω)rω2sω2sωr][(−ω)rω2sω2sωr]
=[ω2r+ω4sωr+2s[(−1)r+1]ωr+2s[(−1)r+1]ω4s+ω2r]
Given P2 = -I
∴ ω2r+ω4s=−1 and ωr+2s[(−1)r+1]=0
Since, rϵ{1,2,3}
and (−1)r + 1 = 0
⇒ r = {1, 3}
Also ω2r+ω4s=−1
r = 1, then ω2+ω4s = -1
which is only possible, when s = 1.
As, ω2+ω4=ω2+ω=−1 [∵ω3=1 and 1+ω+ω2=0]
∴ r = 1, s = 1
Again, if r = 3, then
ω6+ω4s=−1
⇒ ω4s=−2 [never possible]
∴ r≠3
⇒ (r, s) = (1, 1) is the only solution.
Hence, the total number of ordered pairs is 1.
∵ P=[(−ω)rω2sω2sωr]
P2=[(−ω)rω2sω2sωr][(−ω)rω2sω2sωr]
=[ω2r+ω4sωr+2s[(−1)r+1]ωr+2s[(−1)r+1]ω4s+ω2r]
Given P2 = -I
∴ ω2r+ω4s=−1 and ωr+2s[(−1)r+1]=0
Since, rϵ{1,2,3}
and (−1)r + 1 = 0
⇒ r = {1, 3}
Also ω2r+ω4s=−1
r = 1, then ω2+ω4s = -1
which is only possible, when s = 1.
As, ω2+ω4=ω2+ω=−1 [∵ω3=1 and 1+ω+ω2=0]
∴ r = 1, s = 1
Again, if r = 3, then
ω6+ω4s=−1
⇒ ω4s=−2 [never possible]
∴ r≠3
⇒ (r, s) = (1, 1) is the only solution.
Hence, the total number of ordered pairs is 1.
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