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Find the instantaneous rate of change of k(x)=xk(x) = x at x=3x = 3.\newlineWrite your answer as an integer or a fractions" target="_blank" class="backlink">fraction. Simplify any fractions.\newline____\newline

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Full solution

Q. Find the instantaneous rate of change of k(x)=xk(x) = x at x=3x = 3.\newlineWrite your answer as an integer or a fraction. Simplify any fractions.\newline____\newline
  1. Identify Function and Point: Identify the function and the point where the rate of change is needed.\newlineFunction: k(x)=xk(x) = x\newlinePoint: x=3x = 3
  2. Calculate Derivative: Calculate the derivative of k(x)k(x) to find the rate of change.\newlineDerivative of k(x)=1k(x) = 1 (since the derivative of xx with respect to xx is 11)
  3. Evaluate at x=3x = 3: Evaluate the derivative at x=3x = 3.\newlineInstantaneous rate of change at x=3x = 3 is 11.

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