Question Function Find the first partial derivative with respect to q Find the first partial derivative with respect to U ∂q∂c=U Simplify c=qUFind the first partial derivative by treating the variable U as a constant and differentiating with respect to q ∂q∂c=∂q∂(qU)Use differentiation rule ∂x∂(cf(x))=c×∂x∂(f(x)) ∂q∂c=U×∂q∂(q)Use ∂x∂xn=nxn−1 to find derivative ∂q∂c=U×1Solution ∂q∂c=U Show Solution Solve the equation Solve for U Solve for c Solve for q U=qc Evaluate c=qUSwap the sides of the equation qU=cDivide both sides qqU=qcSolution U=qc Show Solution
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