Verbal Model
There was no word problem, so it would be a null equation.
851/12
Let the unknown number be represented by ( x ). The phrase "six times a number" translates to ( 6x ), and "three more than six times a number" becomes ( 6x + 3 ). The statement "thirty-three more than that same number" can be expressed as ( x + 33 ). Therefore, the equation that represents the word problem is ( 6x + 3 = x + 33 ).
Variable
To write a system of equations based on a word problem, first identify the key variables that represent the unknown quantities in the scenario. Next, translate the relationships and conditions described in the problem into mathematical expressions using these variables. Finally, combine these expressions into a system of equations that accurately represents the problem's context and constraints. Be sure to double-check that each equation corresponds to the information given in the problem.
Without an equality sign the given expression can't be considered to be an equation
There was no word problem, so it would be a null equation.
the answer is "arrow"
851/12
x2
FeC
The word equation for releasing energy is "energy + reactants = products + energy." This represents a process where energy is released as a product of a chemical reaction.
This word equation represents the reaction between magnesium and oxygen to form magnesium oxide. Magnesium (Mg) reacts with oxygen (O2) to produce magnesium oxide (MgO). This is a chemical equation showing the interaction between these elements.
Let the unknown number be represented by ( x ). The phrase "six times a number" translates to ( 6x ), and "three more than six times a number" becomes ( 6x + 3 ). The statement "thirty-three more than that same number" can be expressed as ( x + 33 ). Therefore, the equation that represents the word problem is ( 6x + 3 = x + 33 ).
Variable
To write a system of equations based on a word problem, first identify the key variables that represent the unknown quantities in the scenario. Next, translate the relationships and conditions described in the problem into mathematical expressions using these variables. Finally, combine these expressions into a system of equations that accurately represents the problem's context and constraints. Be sure to double-check that each equation corresponds to the information given in the problem.
Another word for an answer in an addition problem is "sum." The sum represents the total obtained when two or more numbers are added together.