What is the value of x which satisfies the following equation?
X= 626 The above equation is of the form (a + b)^ 2 -(a-b)^2 That simplifies to 4AB Here A= 10 ^624 and B= 25
SO 4AB = 4 * 25 * 10^624 === 100 * 10^624 === 10^626 Hence X= 626
Find the positive integer x that satisfies the following equation (not as complex as it seems to be)
Find the value of x in the following equation?
If C, A and R not necessarily distinct, non-zero integers ranging from 1 to 9, what is the value of each of C, A, R?
C A R C A C ------ A R C ------
a^2 + b^2 = a.b It is obvious that a=b=0 satisfies the equation above. But is there another pair of real numbers satisfying this equation?