Write two different numbers that when rounded to the nearest tenth will give you 18.3
18.31
18.29
or,
18.34901326r7812364781263748126478
18.2500000000000000000000036746237642378
To find two different numbers that, when rounded to the nearest tenth, will give you 18.3, we can use the concept of rounding.
Rounding to the nearest tenth means finding the nearest multiple of 0.1. In this case, we are looking for numbers that are rounded to 18.3, so their tenths place would be 0.3.
To get such numbers, we can use the formula:
Number = Rounded number + Difference
First, let's find the rounded number of 18.3.
Since the tenths digit is 0.3, we know that the number lies between 18.25 and 18.35.
To round it to the nearest tenth, we see that it is closer to 18.3, so the rounded number is 18.3.
Next, let's find the difference between the number and the rounded number:
Difference = Number - Rounded number
Let's assign a variable 'x' to represent the original number.
Difference = x - 18.3
To get two different numbers that, when rounded to the nearest tenth, will give you 18.3, we need to set up two different equations with different differences.
Equation 1: Difference = x - 18.3 = 0.05
Solving for x, we get:
x = 18.3 + 0.05
x = 18.35
Equation 2: Difference = x - 18.3 = -0.05
Solving for x, we get:
x = 18.3 - 0.05
x = 18.25
So, the two different numbers that, when rounded to the nearest tenth, will give you 18.3 are 18.35 and 18.25.