Which Of The Following Is The Smallest Value, Have you ever been asked to compare different values and determine which one is the smallest? It can, General, which-of-the-following-is-the-smallest-value, Timnesia
Have you ever been asked to compare different values and determine which one is the smallest? It can be a tricky task, especially if the values are not in the same unit or scale. However, with some basic math skills and logical thinking, you can easily identify the smallest value among the given options.
So, which of the following is the smallest value? Let's take a look at some possible scenarios and solutions.
Scenario 1: Comparing fractions
Suppose you are given the following fractions: 1/2, 1/3, 1/4, and 1/5. To determine which one is the smallest, you need to find a common denominator first. In this case, the common denominator is 60 (the least common multiple of 2, 3, 4, and 5).
Now, you can convert each fraction to an equivalent fraction with 60 as the denominator:
1/2 = 30/60
1/3 = 20/60
1/4 = 15/60
1/5 = 12/60
From this, you can see that the smallest value is 1/5 or 12/60.
Scenario 2: Comparing decimals
Suppose you are given the following decimals: 0.25, 0.5, 0.1, and 0.2. To determine which one is the smallest, you need to compare their decimal values directly. The smaller the decimal value, the smaller the number.
From this, you can see that the smallest value is 0.1.
Scenario 3: Comparing negative numbers
Suppose you are given the following negative numbers: -5, -8, -2, and -1. To determine which one is the smallest, you need to compare their absolute values (the distance from zero) first. The smaller the absolute value, the smaller the number.
From this, you can see that the smallest value is -1.
Scenario 4: Comparing mixed units
Suppose you are given the following values: 10 cm, 1 m, 1 km, and 1 mm. To determine which one is the smallest, you need to convert all the values to a common unit. In this case, let's convert everything to meters.
10 cm = 0.1 m
1 m = 1 m
1 km = 1000 m
1 mm = 0.001 m
From this, you can see that the smallest value is 1 mm or 0.001 m.
In conclusion, determining the smallest value among different options requires careful analysis and comparison based on the given context and units. By following some basic math principles and logical reasoning, you can confidently identify the smallest value and make informed decisions.