Let ∆ = Axx21Byy21Czz21 and ∆1 = ABCx2y2z2111, then AxByCzx2y2z2111
∆1 = 2∆
∆1 = - ∆
∆1 = ∆
∆1 ≠ ∆
The function f(x) = x2 + 2x - 5 is strictly increasing in the interval
(- ∞, - 1)
[- 1, ∞)
(- ∞, 1]
(- 1, ∞)
The point on the curve y2 = x where the tangent makes an angle of π/4 with X-axis is
(4, 2)
12, 14
14, 12
(1, 1)
If 3xx1 = 3241, then x is equal to
4
8
2
± 22
If 2130x + y012 = 5618, then the value of x and y are
x = 3, y = 3
x = - 3, y = 3
x = 3, y = - 3
x = - 3, y = - 3
The range of sec-1x is
0, π - π2
- π2, π2
0, π
If y = fxgxhxlmnabc, then dydx is equal to
f'xg'xh'xlmnabc
lmnfxgxhxabc
f'xlag'xmbh'xnc
lmnabcf'xg'xh'x
If A is a square matrix of order 3 x 3, then KA is equal to
k2A
KA
3KA
k3A
If A = 1πsin-1πxtan-1xπsin-1xπcot-1πx, B = - cos-1πxtan-1xπsin-1xπ- tan-1πx, then A - B is
0
12I
I
2I
If f(x) = kx2 if x ≤ 23 if x > 2is continuous at x = 2, then the value of k is
3/4
4/3
3
A.
We have,fx = kx2 if x ≤ 23 if x > 2Since, f(x) is continuous at x = 2∴ LHLat x = 2 = RHLat x = 2⇒ limx→2-kx2 = limx→2+3⇒ limh→0k2 - h2 = 3⇒ k2 - 02 = 3⇒ 4k = 3⇒ k = 34