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we have to solve for when this equation equals zero vs we have to solve for the partial derivative

These two phrases are not directly comparable as they refer to different concepts. The first phrase is about solving an equation for a specific value, while the second phrase is about finding the partial derivative of a function. Both phrases are correct in their respective contexts.

Last updated: March 15, 2024 • 546 views

we have to solve for when this equation equals zero

This phrase is correct and commonly used in mathematics when referring to finding the value(s) that make an equation equal to zero.

This phrase is used when discussing mathematical equations and the process of determining the specific value(s) that satisfy the equation by making it equal to zero.

Examples:

  • We have to solve for when this equation equals zero to find the roots.
  • To find the solutions, we need to solve for when this equation equals zero.
  • The first step is to solve for when this equation equals zero.
  • Can you help me solve for when this equation equals zero?
  • The goal is to solve for when this equation equals zero.
  • Now we have to solve for when this equation equals zero. This is where I am stuck, I know it is just algebra. differential-equations mathematical-modeling ...

we have to solve for the partial derivative

This phrase is correct when discussing calculus and the process of finding the partial derivative of a function with respect to a specific variable.

This phrase is used in calculus when referring to the process of finding the partial derivative of a function with respect to a particular variable.

Examples:

  • We need to solve for the partial derivative with respect to x.
  • To continue, we have to solve for the partial derivative of the function.
  • The next step is to solve for the partial derivative.
  • Can you help me solve for the partial derivative of this function?
  • It's important to solve for the partial derivative accurately.
  • Now we have to solve for the partial derivative with respect to capacity. Taking again equations (8)-. (9): ∂. ∂xi(t). Rt(x(t), π, ω) = rT ×. ∂. ∂xi(t) u(x(t) − ζt, π, lt,qt ).

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