![]() ![]() ![]() Similarly, we can expect problems to find the value of the smallest even prime number and the smallest odd prime number. We should not also consider 1 as a composite number as it does not have more than 2 factors. We should not consider 1 as prime as it cannot be written as a product of two natural numbers. We should not consider rational numbers as factors while finding the prime number. $\ therefore $ We have to fill the given blank with 2. We can see that the smallest natural number that is greater than 1 is 2. We can see that the number 2 is immediately next to 1 and is divisible by 1 and 2 itself, which satisfies the property of a prime number. Let us check the natural numbers that were just greater than 1. The prime number is defined as the natural number that is greater than 1 which is divisible only by itself and 1. We know that the prime number is defined as the natural number which is greater than 1 which is not a product of two smaller natural numbers than it. Now, let us recall the definition of a prime number. We then consider the natural number that is immediately next to 1 and verify whether it is satisfying the properties of a natural number to get the required answer.Īccording to the problem, we are asked to fill the blank with a suitable number: The smallest prime number is _.
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