(a) 88(b) 115(c) 203(d) 14326. Find The Smallest Number By Which The Given Numbers Must Be Multiplied So That The Productbecomes A Perfect Square.(a) 605(b) 3468(c) 1458(d) 770777. Find The Smallest Number By Which The Given Numbers Must Be Divided So
Finding the Smallest Number to Multiply or Divide for Perfect Square
In mathematics, a perfect square is a number that can be expressed as the square of an integer. For example, 16 is a perfect square because it can be expressed as 4^2. However, not all numbers are perfect squares. In this article, we will discuss how to find the smallest number that must be multiplied or divided by a given number to make it a perfect square.
Method to Find the Smallest Number
To find the smallest number that must be multiplied or divided by a given number to make it a perfect square, we need to follow these steps:
- Prime Factorization: The first step is to find the prime factorization of the given number.
- Identify the Missing Factors: Next, we need to identify the missing factors that are required to make the number a perfect square.
- Multiply or Divide: Finally, we need to multiply or divide the given number by the smallest number that contains the missing factors.
Example 1: Find the Smallest Number to Multiply
Let's consider the number 88. We need to find the smallest number that must be multiplied by 88 to make it a perfect square.
Step 1: Prime Factorization of 88
The prime factorization of 88 is:
88 = 2^3 × 11
Step 2: Identify the Missing Factors
To make 88 a perfect square, we need to find the missing factors. Since 88 has three 2's and one 11, we need to find the smallest number that contains two 2's and one 11.
Step 3: Multiply
The smallest number that contains two 2's and one 11 is 2^2 × 11 = 44. Therefore, the smallest number that must be multiplied by 88 to make it a perfect square is 44.
Answer: (a) 605 is incorrect, the correct answer is 44.
Example 2: Find the Smallest Number to Divide
Let's consider the number 115. We need to find the smallest number that must be divided by 115 to make it a perfect square.
Step 1: Prime Factorization of 115
The prime factorization of 115 is:
115 = 5 × 23
Step 2: Identify the Missing Factors
To make 115 a perfect square, we need to find the missing factors. Since 115 has one 5 and one 23, we need to find the smallest number that contains two 5's and two 23's.
Step 3: Divide
The smallest number that contains two 5's and two 23's is 5^2 × 23^2 = 2925. Therefore, the smallest number that must be divided by 115 to make it a perfect square is 2925.
Answer: (b) 3468 is incorrect, the correct answer is 2925.
Example 3: Find the Smallest Number to Multiply
Let's consider the number 203. We need to find the smallest number that must be multiplied by 203 to make it a perfect square.
Step 1: Prime Factorization of 203
The prime factorization of 203 is:
203 = 7 × 29
Step 2: Identify the Missing Factors
To make 203 a perfect square, we need to find the missing factors. Since 203 has one 7 and one 29, we need to find the smallest number that contains two 7's and two 29's.
Step 3: Multiply
The smallest number that contains two 7's and two 29's is 7^2 × 29^2 = 4801. Therefore, the smallest number that must be multiplied by 203 to make it a perfect square is 4801.
Answer: (c) 1458 is incorrect, the correct answer is 4801.
Example 4: Find the Smallest Number to Divide
Let's consider the number 14326. We need to find the smallest number that must be divided by 14326 to make it a perfect square.
Step 1: Prime Factorization of 14326
The prime factorization of 14326 is:
14326 = 2 × 7 × 1027
Step 2: Identify the Missing Factors
To make 14326 a perfect square, we need to find the missing factors. Since 14326 has one 2, one 7, and one 1027, we need to find the smallest number that contains two 2's, two 7's, and two 1027's.
Step 3: Divide
The smallest number that contains two 2's, two 7's, and two 1027's is 2^2 × 7^2 × 1027^2 = 230444444. Therefore, the smallest number that must be divided by 14326 to make it a perfect square is 230444444.
Answer: (d) 770777 is incorrect, the correct answer is 230444444.
Frequently Asked Questions
Q: What is a perfect square?
A: A perfect square is a number that can be expressed as the square of an integer. For example, 16 is a perfect square because it can be expressed as 4^2.
Q: Why do we need to find the smallest number to multiply or divide?
A: We need to find the smallest number to multiply or divide because it is the most efficient way to make a number a perfect square. Multiplying or dividing by a larger number would result in a larger perfect square, which may not be necessary.
Q: How do I find the prime factorization of a number?
A: To find the prime factorization of a number, you need to break it down into its prime factors. For example, the prime factorization of 12 is 2^2 × 3.
Q: What if the number has multiple prime factors?
A: If the number has multiple prime factors, you need to find the smallest number that contains all the prime factors. For example, if the number is 12 × 15, you need to find the smallest number that contains 2^2, 3, 3, and 5.
Q: Can I use a calculator to find the smallest number?
A: Yes, you can use a calculator to find the smallest number. However, it is recommended to use a calculator only as a last resort, as it may not provide the most efficient solution.
Q: What if the number is a perfect square already?
A: If the number is already a perfect square, then the smallest number to multiply or divide is 1.
Q: Can I use this method to find the smallest number for any type of number?
A: Yes, you can use this method to find the smallest number for any type of number, including integers, fractions, and decimals.
Q: Is this method only applicable for positive numbers?
A: No, this method is applicable for both positive and negative numbers.
Q: Can I use this method to find the smallest number for a large number?
A: Yes, you can use this method to find the smallest number for a large number. However, it may take longer to find the solution.
Q: Is there a shortcut to find the smallest number?
A: Yes, there is a shortcut to find the smallest number. You can use the following formula:
Smallest number = (Prime factorization of the number)^2
This formula can be used to find the smallest number quickly and efficiently.
Q: Can I use this method to find the smallest number for a number with multiple prime factors?
A: Yes, you can use this method to find the smallest number for a number with multiple prime factors. You need to find the smallest number that contains all the prime factors.
Q: Is this method only applicable for numbers with prime factors?
A: No, this method is applicable for numbers with any type of factors, including composite numbers.
Q: Can I use this method to find the smallest number for a number with a large number of prime factors?
A: Yes, you can use this method to find the smallest number for a number with a large number of prime factors. However, it may take longer to find the solution.
In conclusion, finding the smallest number to multiply or divide for a perfect square involves prime factorization, identifying the missing factors, and multiplying or dividing the given number by the smallest number that contains the missing factors. We have discussed frequently asked questions to provide a better understanding of this method.