Find the distance between -345- plane is a cubic batteries of length 7-7overset-o-A-

Question

Toppr Admin · Accepted Answer

To find the distance between adjacent plane -h-k-l-x3B1-a-x221A-h2-k2-l2-x21D2-a-7oA-x21D2-h-3-k-4-l-5-x3B1-7oA-x221A-32-42-52-7oA-x221A-50-0-98oAThus- the distance between plane is 0-98oA -

Find the distance between $(345)$ plane is a cubic batteries of length $7 - 7 o A$ .

To find the distance between adjacent plane $(h, k, l)$
$α = \frac{a}{\sqrt{h^{2} + k^{2} + l^{2}}}$
$\Rightarrow a = 7 o A$
$\Rightarrow h = 3, k = 4, l = 5$
$α = \frac{7 o A}{\sqrt{3^{2} + 4^{2} + 5^{2}}} = \frac{7 o A}{\sqrt{50}} = 0.98 o A$
Thus, the distance between plane is $0.98 o A$ .

Find the distance between (345) plane is a cubic batteries of length 7−7oA.

To find the distance between adjacent plane (h,k,l)α=a√h2+k2+l2⇒a=7oA⇒h=3,k=4,l=5α=7oA√32+42+52=7oA√50=0.98oAThus, the distance between plane is 0.98oA .

Find the distance between $(345)$ plane is a cubic batteries of length $7 - 7 o A$ .

To find the distance between adjacent plane $(h, k, l)$
$α = \frac{a}{\sqrt{h^{2} + k^{2} + l^{2}}}$
$\Rightarrow a = 7 o A$
$\Rightarrow h = 3, k = 4, l = 5$
$α = \frac{7 o A}{\sqrt{3^{2} + 4^{2} + 5^{2}}} = \frac{7 o A}{\sqrt{50}} = 0.98 o A$
Thus, the distance between plane is $0.98 o A$ .