Correct energy order of `3p_(x), 3d_(xy), 2p_(x)`

According to aufbau principle, the correct order of energy of 3d, 4s and 4p-orbitals is

If sqrt(3) and -sqrt(3) are the zeroes of a polynominal p(x), then p(x) is

What must be subtracted or added to p(x) = 8x^(4) + 14x^(3)-2x^(2) + 8x -12 so that 4x^(2) + 3x - 2 is a factor of p(x)?

Which of the following are correct ? (1) Electron density in XY plane for d_(x^(2)-y^(2)) orbital is zero. (2) The energy of 3p-orbital is higher than the energy of 2p-orbital. (3) 3p_(z) orbital has one angular node. (4) 4f-orbital has no radial node.

Consider three planes P _(1) = x-y + z=1 , P_(2) = x + y -z = -1 and P _(3) , x - 3y + 3z =2. Let L_(1), L_(2) and L_(3) be the lines of intersection of the planes P _(2) and P _(3) , P _(3) and P _(1), and P _(2), respectively Statement -1: At least two of the lines L _(1), _(2) and L _(3) are non-parallel . Statement -1: the three planes fo not have a common point

If p(x) = 3x^2-x-4 , then p(-1)=

If p(x)=x^(2)-5x-6 , then find the values of p(1),p(2),p(3),p(0),p(-1),p(-2),p(-3) .

Given P(x)=x^(4)+ax^(3)+bx^(2)+cx +d such that x=0 is the only real root of P'(x)==0 . If P(-1) lt P(1) , then in the interval [-1,1]

Check whether 3 and -2 are the zeroes of the polynomial p(x) when p(x) = x^(2) - x -6.