Equations and Applications
Selected Reading
- Translating a sentence into a multi-step equation
- Solving a fraction word problem using a linear equation of the form Ax = B
- Solving an equation with parentheses
- Using two steps to solve an equation with whole numbers
- Multiplicative property of equality with fractions
- Multiplicative property of equality with whole numbers: Fractional answers
- Multiplicative property of equality with decimals
- Additive property of equality with decimals
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Translating a sentence into a multi-step equation
Translating a sentence into a multi-step equation
In word problems, the sentences are translated into multi-step equations for solving. This process can be best understood using examples given below.
Translate the following sentence into an equation.
The sum of a number spanided by 8 and 9 equals 3.
Solution
Step 1:
Let the number be x
Step 2:
‘Number spanided by 8’ is $frac{x}{8}$
Step 3:
The word ‘sum’ points to ‘addition’ or ‘+’ operation. The sum of a number spanided by 8 and 9 translates to
$frac{x}{8} + 9$
Step 4:
The word ‘equals’ translates to ‘=’ sign
So, ‘The sum of a number spanided by 8 and 9 equals 3’ translates to
$frac{x}{8} + 9 = 3$
Translate the following sentence into an equation.
Nine times the difference of a number and 7 equals 4.
Solution
Step 1:
Let the number be x
Step 2:
The word ‘difference’ points to ‘subtraction’ or ‘−’ operation
So, ‘Difference of the number and 7’ is x − 7
Step 3:
The word ‘times’ points to ‘multippcation’ or ‘×’ operation
Nine times the difference of a number and 7 is 9 × (x − 7) or 9(x − 7)
Step 4:
The word ‘equals’ translates to ‘=’ sign
So, ‘Nine times the difference of a number and 7 equals 4’ translates to
9(x − 7) = 4