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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Solving a fraction word problem using a linear equation of the form Ax = B
Solving a fraction word problem using a pnear equation of the form Ax = B
In this type of problems, we use pnear equations of the form Ax = B.
B is given as a quantity which is a fractional part (A) of another unknown quantity x.
So, A and B are given and x is to be found here.
Rules to be followed while solving pnear equations of the form Ax = B
The quantity A is usually a fraction and B is a whole number or decimal.
There is multiplying/spaniding on both sides of the equation to isolate the unknown variable x.
Cross multiplying is done, if required, and the equation is solved to get the value of x.
Some solved examples given below will help in understanding the lesson.
A store sold 35 video game consoles on a single day which is one-ninth of their monthly sales. What is then the monthly sales of the store?
Solution
Step 1:
Let the number of game consoles sold in a month = x; Then given $35 = frac{1x}{9}$
Step 2:
Cross multiplying
x = 35 × 9 = 315
So, total number of game consoles sold in a month = 315
Jeanie traveled 15 kilometers of her journey, which is one-eighth of total journey. How long is her total journey then?
Solution
Step 1:
Let the total journey in kilometers be = x; Then given $15 = frac{1x}{8}$
Step 2:
Cross multiplying
x = 15 × 8 = 120
So, total journey in kilometers = 120 km