if the HCF OF 657 and 963 is expressible in the form of 657*22+963y find y
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Heya,
We need to find the H.C.F. of 963 and 657 and express it as a linear combination of 963 and 657. By applying Euclid’s division lemma, 963 = 657 x 1 + 306.
Since remainder ≠ 0, apply division lemma on divisor 657 and remainder 306
657 = 306 x 2 + 45.
Since remainder ≠ 0, apply division lemma on divisor 306 and remainder 45
306 = 45 x 6 + 36.
Since remainder ≠ 0, apply division lemma on divisor 45 and remainder 36
45 = 36 x 1 + 9.
Since remainder ≠ 0, apply division lemma on divisor 36 and remainder 9
36 = 9 x 4 + 0.
Therefore, H.C.F. = 9.
Now, 9 = 45 – 36 x 1
= 45 – [306 – 45 x 6] x 1 = 45 – 306 x 1 + 45 x 6
= 45 x 7 – 306 x 1 = [657 -306 x 2] x 7 – 306 x 1
= 657 x 7 – 306 x 14 – 306 x 1
= 657 x 7 – 306 x 15
= 657 x 7 – [963 – 657 x 1] x 15
= 657 x 7 – 963 x 15 + 657 x 15
= 657 x 22 – 963 x 15.
Hence, obtained.
Hope this helps you....
We need to find the H.C.F. of 963 and 657 and express it as a linear combination of 963 and 657. By applying Euclid’s division lemma, 963 = 657 x 1 + 306.
Since remainder ≠ 0, apply division lemma on divisor 657 and remainder 306
657 = 306 x 2 + 45.
Since remainder ≠ 0, apply division lemma on divisor 306 and remainder 45
306 = 45 x 6 + 36.
Since remainder ≠ 0, apply division lemma on divisor 45 and remainder 36
45 = 36 x 1 + 9.
Since remainder ≠ 0, apply division lemma on divisor 36 and remainder 9
36 = 9 x 4 + 0.
Therefore, H.C.F. = 9.
Now, 9 = 45 – 36 x 1
= 45 – [306 – 45 x 6] x 1 = 45 – 306 x 1 + 45 x 6
= 45 x 7 – 306 x 1 = [657 -306 x 2] x 7 – 306 x 1
= 657 x 7 – 306 x 14 – 306 x 1
= 657 x 7 – 306 x 15
= 657 x 7 – [963 – 657 x 1] x 15
= 657 x 7 – 963 x 15 + 657 x 15
= 657 x 22 – 963 x 15.
Hence, obtained.
Hope this helps you....
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