If a solid `A^(o+)B^(ɵ)` having `ZnS` Structure is heated so that the ions along two of the axis passing throgh the face centre particles are lost and bivalent ion `(Z)` enters herre to maintain the electrical neutrality, so that the new formula unit becomes `A_(x)B_(y)C_(c)`, report the value of `x + y + c`.

A variable plane at a distance of 1 unit from the origin cuts the coordinate axes at A,B and C satisfies the relation 1/x^2+1/y^2+1/z^2= k , then the value of k is :

A solid has a structure in which X atoms are located at cubic corners of unit cell, O atom are at the edge centres and Y atoms at cube centre. Then the formula of compound is X_(a)Y_(b)O_(c) If two atoms of O missing from any of two edge centres per unit cell, then the molecular formula is X_(a)Y_(b)O_(z) . Then, find the value of (x + y + z) - (a + b+ c) .

If the curve y=2x^(3)+ax^(2)+bx+c passes through the origin and the tangents drawn to it at x=-1 and x = 2 are parallel to the X - axis, then the values a, b and c are respectively

A compound formed by elements X and Y has a cubic structure in which X atoms are at the face centres. Y atoms are present at the body center and also at the alternate edge center of the cube. a. Calculate: (i) Z_(eff') (ii) total number of atoms in a cube, and (iii) formula of the compound. b. If all the atoms are removed from a single axis passing through the centre of the cube, calculate (i) Z_(eff') (ii) total number of atoms in a cube, and (iii) formula of the compound.

An electric field is uniform and E=200 hatiNC^(-1) along +x s and E=-200hatiNC^(-1) along -x direction. A right circular cylinder of length 0.20 m and radius 0.05 m has its centre at the origin and its axis along the x-axis so that one face is x=+0.10m and the other =x-0.10m . a. What is the net outward flux through each flat face? b. What is the flux through the side of the cylinder? c. What is the net outward flux throught the cylinder? d. What is the net charge inside the cylinder?

Equation of the plane passing through the line of intersection of the planes P= ax + by + cz + d = 0, P^(') = a^(')x + b^(')y + c^(')z + d^(') = 0 and parallel to x-axis it

X is a human being with the reproductive oval shaped almond sized organ Y which releases mature gamete Z monthly once that goes into tube like structure A where it fuses with another gamete called B to form a new cell C. This cell C divides vigorously to form a ball of cells D which gets embedded in the thick lining of organ E of the reproductive system of X where it grows and develops into a foetus. i] Identify X, as male or female. ii] Name the reproductive part Y and give its two functions. iii] Name the gametes Z and B. Iv] Name the process which leads to the formation of C and Identify C. v] Name the ball of cells D. vi] Identify the organ E.

In the given figure 4.13 ,xy and x'y' are two parallel tangents to a circle with centre O and another tangent AB with point of contact C intersecting xy at A and x'y' at B. Prove that angle AOB =90^@ .