The following steps are involved in finding the value of `(97)^(2)` by using a suitable identify . Arrange them in sequential order from the first to the last .
(A) 10000 - 600 + 9 = 9409
(B) Using the identify `(a - b)^(2) = a^(2) - 2ab + b^(2)`, where a = 100 and b = 3.
(C) `(97)^(2) = (100 - 3)^(2)`
(D) `(100-3)^(2) = (100)^(2) - 2 (100)(3) + 3^(2)`

The following are the steps involved in finding the value of (n)/(r) from .^(n)P_(r)=1320 . Arrange them in sequential order.

The following steps are involved in expanding (x+ 3y)^(2) . Arrange them in sequential order from the first to the last . (A) (x + 3y)^(2) = x^(2) + 6xy + 9y^(2) (B) (x + 3y)^(2) = (x)^(2) + 2(x)(3y) + (3y)^(2) (C) Using the identify (a + b)^(2) = a^(2) + 2ab + b^(2) , where a = x and b = 3y.

The following sentences are the steps involved in eliminating theta from the equations x=y tan theta and a = b sectheta . Arrange them in sequential order from first to last.

The following steps are involved in finding the value of 100 (3)/(4) xx 99(1)/(4) by using appropriate identify . Arrange them in sequential order . (A) (100 + (3)/(4)) (100 - (3)/(4)) = (100)^(2) - ((3)/(4))^(2) [ because (a + b) (a - b) = a^(2) - b^(2)] (B) 10000 - (9)/(16) = 9999 + 1 - (9)/(16) = 9999 (7)/(16) (C) (100)^(2) - ((3)/(4))^(2) = 10000 - (9)/(16) (D) 100 (3)/(4) xx 99 (1)/(4) = (100 + (3)/(4)) (100 - (3)/(4))

The following steps are involved in finding the value of a^(4) + (1)/(a^(4)) when a + (1)/(a) = 1 . Arrange them in sequential order from the first to the last . (A) a^(2) + (1)/(a^(2)) + 2 = 1 implies a^(2) + (1)/(a^(2)) = -1 (B) (a^(2))^(2) + ((1)/(a^(2))^(2))^(2) = 1^(2) (C) (a + (1)/(a))^(2) = 1^(2) (D) (a^(2) + (1)/(a^(2)))^(2) = (-1)^(2) E a^(4) + (1)/(a^(4)) = -1