Resolve for C: A[(B+C)^D-C^D]=E

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In summary, the purpose of "Resolve for C: A[(B+C)^D-C^D]=E" is to find the value of C that satisfies the given equation. The variables involved in this equation are A, B, C, D, and E. To solve for C, you can use algebraic techniques such as combining like terms, factoring, and isolating the variable on one side of the equation. This equation can still be solved if one of the variables is missing, but assumptions or substitution may be necessary. Additionally, this equation can have multiple solutions for C, meaning there can be more than one value of C that satisfies the given equation.
  • #1
MrXY
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Hi, I want to resolve this equation for C:
A[(B+C)^D-C^D]=E
Is there any way?
Thanks
 
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  • #2
MrXY said:
Hi, I want to resolve this equation for C:
A[(B+C)^D-C^D]=E
Is there any way?
Thanks
Is this homework or a problem in a book?
 

FAQ: Resolve for C: A[(B+C)^D-C^D]=E

1. What is the purpose of "Resolve for C: A[(B+C)^D-C^D]=E"?

The purpose of "Resolve for C: A[(B+C)^D-C^D]=E" is to find the value of C that satisfies the given equation.

2. What are the variables involved in this equation?

The variables involved in this equation are A, B, C, D, and E.

3. How do I solve for C in this equation?

To solve for C, you can use algebraic techniques such as combining like terms, factoring, and isolating the variable on one side of the equation.

4. Can this equation be solved if one of the variables is missing?

Yes, this equation can still be solved if one of the variables is missing. However, you may need to make assumptions or use substitution to solve for the missing variable.

5. Can this equation have multiple solutions for C?

Yes, this equation can have multiple solutions for C. This means that there can be more than one value of C that satisfies the given equation.

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