kkk579
hello
no matter how times i read the solution and attempt it i cannot understand why they let k equal 4p, 4p+1, etc. it says n is divided by 4 so why k?
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proofs q (1 Viewer)
- Thread starter kkk579
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kkk579
hello
Also for this q could u apply the concept factor R/S and say that x = plus minus b / plus minis a, but for simplicity we only look at b/a. Then we can say that b /a is essentially (k x p)/(k x q) where k is js a scaling factor. Therefore p can divide b and q can divide a.
kendricklamarlover101
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since k is an integer then it can be written in the form 4m+r, where r is the remainder. we choose k instead of n as n is specifically a square integer (k^2) and if u do substitute it as 4m+r u probably wont be able to easily find the contradiction as u cant really do any working out if u blindly substitute n.
x is a root of the equation and ur assuming that b/a is also a root which is not true.
kkk579
hello
for the 2nd q yeah that does make sense, but for the 1st one the q says that n is getting divided by 4 so i still dont understand why we let n = 4p + r
kendricklamarlover101
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we dont, we let k=4p+r
kkk579
hello
sorry i meant to type k =4p+r
kkk579
hello
wait actually i think i get it now
kkk579
hello
yepp
Uhm in Q1, letting k be even and k be odd ie k=2p and k=2p+1 works just fine. Not sure the fuss with 4...but this comes from this number theory concept called modulo arithmetic that claims that every integer k can be written as either 4p, 4p+1, 4p+2, 4p+3, because when you reach 4p+4 you looped back to 4(p+1) which is of the first type.