A. 22
B. 24
C. 26
D. 28
s varies directly as the square of p. When s = 3.5, p = 0.5 If s = 90, then c would be equal to
Find tan 9 − tan 27 − tan 63 + tan 81 ( all angles in degrees)
The largest value of min (2 + x², 6 - 3x) when x > 0 is
If s varies directly as e and s/e = 6, then what is the value of s when e = 2.2?
If (h – 3) = 4h – 7, then which of the following could be the value of h?
Which of the following value of x do not satisfy the inequality (x² - 3x + 2 > 0) at all?
If m and n are whole numbers such that mn = 121, the value of (m - 1)n + 1 is:
If x varies as y2 + 2 and is equal to 36 when y = 4, find x when y = 12.
Find the number of solutions in positive integers (k; a1, a2, . . . , ak; b1, b2, . . . , bk) to the equation a1(b1) + a2(b1 + b2) + · · · + ak(b1 + b2 + . . . + bk) = 7
Find the number of triplets of real numbers (x, y, z) which satisfy (x + y)3 = z (y + z)3 = x (z + x)3 = y