For an anisotropic solid a values in x, y, z
direction is 2:3:7. If coefficient of
volume expansion is 2.4 x 10-6/°Cfind
areal expansion coefficient of the solid in
XZ plane.
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Given:
For an anisotropic solid a values in x, y, z
direction is 2:3:7. Coefficient of
volume expansion is 2.4 x 10-6/°C.
To find:
Areal expansion coefficient of the solid in the XZ plane.
Calculation:
Let us assume "a" is the constant of proportionality.
So , the linear expansion coefficient along the respective axes will be :
X axis = 2a
Y axis = 3a
Z axis = 7a
We know that algebraic summation of the linear expansion coefficient along the three axes will give us the volume expansion coefficient.
So, Areal Expansion Coefficient can be calculated by algebraic summation of the linear expansion coefficient along the X axis and the Z axis.
So final answer is:
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