The degree of the differential equation 1 + dydx22 = d2ydx2 is
3
2
1
4
∫cos2x - cos2θcosx - cosθdx is equal to
2sinx + xcosθ
2sinx - xcosθ
2sinx + 2xcosθ
2sinx - 2xcosθ
If a = 2i^ + λj^ + k^ and b = i^ + 2j^ + 3k^ are orthogonal, then value of λ is
3/2
0
- 5/2
D.
We have, a = 2i^ + λj^ + k^and b = i^ + 2j^ + 3k^Since, a and b are orthogonal∴ a . b = 0⇒ 2i^ + λj^ + k^ . i^ + 2j^ + 3k^ = 0⇒ 2 + 2λ + 3 = 0⇒ 2λ + 5 = 0⇒ λ = - 52
If a, b, c are unit vectors such that a + b + c = 0, then the value of a · b + b · c + c · a is equal to
- 3/2
The plane 2x - 3y + 6z - 11 = 0 makes an angle sin-1(α) with X-axis, the value of α is equal to
23
27
32
37
∫0.23.5xdx is equal to
3.5
4.5
The perpendicular distance of the point P(6, 7, 8) from XY-plane is
6
7
5
8
The integrating factor of the differential equation x . dydx + 2y = x2 is x ≠ 0
x
logx
x2
elogx
∫0π2tan7xcot7x + tan7xdx is equal to
π4
π2
π6
π3
Reflexion of the point α, β, γ in XY-plane is
0, 0, γ
- α, - β, γ
α, β, - γ
α, β, 0
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