az az an 1. Given Equation 3.2 and Equation 3.2a as shown below, and R = X₁ X₂ X as the form of a product of the respective primary variables raised to exponents. Proof that Equation 3.2 is equal to Equation 3.2a. Hint: using the partial derivative of R with respect to x; where i=1,2,..., n. (²) + (-) +---+ (T ** - Σ(**)*** WR R Xi 1/2 [3.2a] [3.2]

Given Equation 3.2 and Equation 3.2a as shown below, and ? = ?1
?1 ?2
?2 ... ??
??
as the form of a product of the
respective primary variables raised to exponents. Proof that Equation 3.2 is equal to Equation 3.2a. Hint: using
the partial derivative of R with respect to xi where i =1,2,..., n.

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an 1. Given Equation 3.2 and Equation 3.2a as shown below, and R = x₁x₂xn as the form of a product of the respective primary variables raised to exponents. Proof that Equation 3.2 is equal to Equation 3.2a. Hint: using the partial derivative of R with respect to x; where i=1,2,..., n. 2 2 27 1/2 ƏR ƏR aR ** = [(* )* + ( ² )*+---- ()] WR= -W₁ ·W₂ +...+ -Wn axi Əx₂ WR xi * - [E(~_^)]" = R X; 1/2 [3.2a] [3.2]