Let be the total number of nodes for a orbital, be the number of angular nodes for a orbital, and be — Atomic Structure Chemistry Question
Question
Let $x$ be the total number of nodes for a $5f$ orbital, $y$ be the number of angular nodes for a $4d$ orbital, and $z$ be the number of radial nodes for a $6p$ orbital. Find the value of $(x + y + z)$.
Answer: 10
💡 Solution & Explanation
The total number of nodes is given by $(n-1)$. For $5f$ ($n=5$), $x = 5 - 1 = 4$. The number of angular nodes is given by $l$. For $4d$ ($l=2$), $y = 2$. The number of radial nodes is given by $(n-l-1)$. For $6p$ ($n=6, l=1$), $z = 6 - 1 - 1 = 4$. The sum $(x + y + z) = 4 + 2 + 4 = 10$.
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