If d is the HCF ( 56,72) Find X and y satisfying d= 56 X + 7y
Answers
Answer:
I like lo ve are you Telu gu girl
Answer:
If d is HCF of 56 and 72, then x, y satisfying the equation d = 56x + 72y. Also, x and y are not unique.
Let's show x and y are not unique.
Explanation:
By Euclid division Lemma,
72 = 56 × 1 + 16 --------> (i)
56 = 16 × 3 + 8 ----------> (ii)
16 = 8 × 2 + 0
So, 8 is the GCF or HCF of 56 and 72.
From (ii) 8 = 56 - (16 × 3)
⇒ 8 = 56 - [( 72 - 56) × 3] from (i)
⇒ 8 = 56 - 72(3) + 56(3)
⇒ 8 = 56(4) - 72(3)
⇒ 8 = 56(4) + 72(-3)
⇒ d = 8 = 56(4) + 72(-3) = 56x + 72y
one set of values for x and y are 4 , -3 respectively.
If we rewrite:
8 = [56 × 4 + (-3) × 72 ] - 56 × 72 + 56 × 72
⇒ 8 = [56 × 4 - 56 × 72] + [(-3) × 72 + 56 × 72]
⇒ 8 = [56(4 - 72)] + [72(-3+56)]
⇒ 8 = 56(-68) + 72(52)
Now, we get a new set of values for x and y as -68 and 52 respectively.
Therefore, x and y are not unique.