The number of space lattices possible for the crystalographic dimensions `alpha ne beta ne gamma`

How many kinds of space lattices are possible in a crystal?

The unit cell with crystallographic dimensions , a= b nec " and " alpha = beta=gamma = 90^0

Example of unit cell with crystallographic dimensions a!=b!=c, alpha=beta=gamma=90^(@) is :

The unit cell with crystallographic dimensions, a ne b ne c, alpha =gamma=90^(@) and beta ne 90^(@) is :

Which of the following crystal is represented by a ne b ne c and alpha ne beta ne gamma ne 90^(@) ?

The minimum value of the expression sin alpha + sin beta+ sin gamma , where alpha,beta,gamma are real numbers satisfying alpha+beta+gamma=pi is

The following diagram shows the arrangement of lattice points with a = b = c and alpha = beta = gamma = 90^(@) . Choose the correct options.

Determine the values of alpha, beta, gamma when [{:(0,2sinbeta,tan gamma),(cos alpha, sin beta,-tan gamma),(cos alpha, -sin beta, tan gamma):}] is orthogonal.

alpha, beta, gamma are real number satisfying alpha+beta+gamma=pi . The minimum value of the given expression sin alpha+sin beta+sin gamma is

Two different real numbers alpha and beta are the roots of the quadratic equation ax ^(2) + c=0 a,c ne 0, then alpha ^(3) + beta ^(3) is: