Calculate the Miller indices of crystal planes which cut through the crystal axes at (i) (2a, 3b, c) (ii) (a, b, c) (iii) (6a, 3b, 3c) and (iv) (2a, -3b, -3c).

Expand : (a + 2b - 3c)^(2)

Expand (4a-2b-3c)^(2) .

Match the following list of animals with their level of organisation. (A) (a - 2), (b - 3), (C-4), (d - 1) (B) (a - 2), (b - 4), (C-3), (d - 1) (C) (a - 4), (b - 1), (C-2), (d - 3) (D) (a - 1), (b - 4), (C-3), (d - 2)

Match the following with reference to cockroach and choose the correct option. (A) (a - iii), (b - iv), (c - ii), (d - i) (B) (a - iv), (b - iii), (c - ii), (d - i) (C) (a - iv), (b - ii), (c - iii), (d - i) (D) (a - ii), (b - iv), (c - iii), (d - i)

Match the followings and choose the correct answer. (A) (a - ii), (b - iii), (c - iv), (d - i) (B) (a - iii), (b - ii), (c - iv), (d - i) (C) (a - i), (b - iii), (c - ii), (d - iv) (D) (a - ii), (b - iv), (c - iii), (d - i)

Match the followings and choose the correct answer. (A) (a - iii), (b - i), (c - ii), (d - iv) (B) (a - ii), (b - i), (c - iv), (d - iii) (C) (a - iii), (b - iv), (c - ii), (d - i) (D) (a - iii), (b - i), (c - iv), (d - ii)

Write each of the following in the form of ax + by + c = 0 and find the values of a, b and c (i) x = -5 (ii) y = 2 (iii) 2x = 3 (iv) 5y = -3

Write each of the following in the form of ax + by + c = 0 and find the values of a, b and c (i) 2x = 5 (ii) y - 2 = 0 (iii) y/7=3 (iv) x= (-14)/13

If a line x+ y =1 cut the parabola y^2 = 4ax in points A and B and normals drawn at A and B meet at C. The normals to the parabola from C other than above two meets the parabola in D, then point D is : (A) (a,a) (B) (2a,2a) (C) (3a,3a) (D) (4a,4a)

The points with coordinates (2a,3a), (3b,2b) and (c,c) are collinear