The word 'defining' comes from a root word 'define', which means to precisely state something, or describe something precisely.
If you were defining the problem, you are precisely describing and stating the problem.
Since one of the categories for this question is Maths, I'd assume this can apply to maths also, in which case 'defining the problem' is working out what you actually have to figure out in the maths problem.
Defining the problem.
choosing a variable to represent one of the unspecified numbers in a problem and using it to write expressions for the other unspecified numbers in the problem.
Defining the problem 2.gathering relevant information 3. presenting/organizing data 4.analyzing data 5. interpreting results
Gottfried Wilhelm Leibniz is credited with defining the standard notation for integrals.
For defining
Defining the problem.
Defining the problem.
a statement that clearly describes the problem to be solved
Research the problem fully...
Defining the problem.
Defining the problem
topics must be defined and narrowed down.
It is not clear what you mean by an incomplete rectangle. If it means the rectangle is not closed then there is a problem of defining its area: what is inside and what is outside when you do not have a boundary? It is not clear what you mean by an incomplete rectangle. If it means the rectangle is not closed then there is a problem of defining its area: what is inside and what is outside when you do not have a boundary? It is not clear what you mean by an incomplete rectangle. If it means the rectangle is not closed then there is a problem of defining its area: what is inside and what is outside when you do not have a boundary? It is not clear what you mean by an incomplete rectangle. If it means the rectangle is not closed then there is a problem of defining its area: what is inside and what is outside when you do not have a boundary?
Defining a problem, developing possible solutions to solve the problem, arriving at the best solution, and implementing it.
Planning
Elaboration involves expanding on a statement with additional information, examples, or reasoning to provide a more detailed understanding of the topic. It can also involve supporting the initial statement with multiple facts, data points, or pieces of evidence to make the argument or explanation more robust and convincing. This helps to clarify the main point and provide a comprehensive view of the topic being discussed.
official defining a problem, developing possible solutions to solve the problem, arriving to the best solution to solve the problem, and implementing it