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2026-01-01
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2026-02-28
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<p>233 Learners</p>
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<p>Last updated on<strong>August 5, 2025</strong></p>
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<p>Last updated on<strong>August 5, 2025</strong></p>
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<p>If a number is multiplied by the same number, the result is a square. The inverse operation to squaring a number is finding its square root. Square roots are used in various fields such as engineering, finance, and more. Here, we will discuss the square root of 792.</p>
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<p>If a number is multiplied by the same number, the result is a square. The inverse operation to squaring a number is finding its square root. Square roots are used in various fields such as engineering, finance, and more. Here, we will discuss the square root of 792.</p>
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<h2>What is the Square Root of 792?</h2>
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<h2>What is the Square Root of 792?</h2>
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<p>The<a>square</a>root is the inverse of squaring a<a>number</a>. 792 is not a<a>perfect square</a>. The square root of 792 can be expressed in both radical and<a>exponential form</a>. In radical form, it is expressed as √792, whereas in exponential form, it is expressed as (792)^(1/2). The value of √792 ≈ 28.14285, which is an<a>irrational number</a>because it cannot be expressed as a simple<a>fraction</a>.</p>
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<p>The<a>square</a>root is the inverse of squaring a<a>number</a>. 792 is not a<a>perfect square</a>. The square root of 792 can be expressed in both radical and<a>exponential form</a>. In radical form, it is expressed as √792, whereas in exponential form, it is expressed as (792)^(1/2). The value of √792 ≈ 28.14285, which is an<a>irrational number</a>because it cannot be expressed as a simple<a>fraction</a>.</p>
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<h2>Finding the Square Root of 792</h2>
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<h2>Finding the Square Root of 792</h2>
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<p>The<a>prime factorization</a>method is used for perfect square numbers. However, for non-perfect squares like 792, methods such as the<a>long division</a>method and approximation method are utilized. Let us now explore these methods: </p>
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<p>The<a>prime factorization</a>method is used for perfect square numbers. However, for non-perfect squares like 792, methods such as the<a>long division</a>method and approximation method are utilized. Let us now explore these methods: </p>
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<ul><li>Prime factorization method</li>
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<ul><li>Prime factorization method</li>
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<li>Long division method</li>
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<li>Long division method</li>
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<li>Approximation method</li>
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<li>Approximation method</li>
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</ul><h2>Square Root of 792 by Prime Factorization Method</h2>
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</ul><h2>Square Root of 792 by Prime Factorization Method</h2>
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<p>The prime factorization of a number involves expressing it as a<a>product</a>of its prime<a>factors</a>. Let's see how 792 can be broken down into its prime factors.</p>
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<p>The prime factorization of a number involves expressing it as a<a>product</a>of its prime<a>factors</a>. Let's see how 792 can be broken down into its prime factors.</p>
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<p><strong>Step 1:</strong>Finding the prime factors of 792 Breaking it down, we get 2 × 2 × 2 × 3 × 3 × 11: 2³ × 3² × 11</p>
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<p><strong>Step 1:</strong>Finding the prime factors of 792 Breaking it down, we get 2 × 2 × 2 × 3 × 3 × 11: 2³ × 3² × 11</p>
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<p><strong>Step 2:</strong>Now that we have found the prime factors of 792, we attempt to make pairs of those prime factors. Since 792 is not a perfect square, the digits cannot all be grouped into pairs, making calculation of the exact<a>square root</a>using prime factorization impossible for simplification.</p>
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<p><strong>Step 2:</strong>Now that we have found the prime factors of 792, we attempt to make pairs of those prime factors. Since 792 is not a perfect square, the digits cannot all be grouped into pairs, making calculation of the exact<a>square root</a>using prime factorization impossible for simplification.</p>
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<h2>Square Root of 792 by Long Division Method</h2>
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<h2>Square Root of 792 by Long Division Method</h2>
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<p>The long<a>division</a>method is particularly useful for non-perfect square numbers. Here’s how to find the square root using the long division method, step by step:</p>
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<p>The long<a>division</a>method is particularly useful for non-perfect square numbers. Here’s how to find the square root using the long division method, step by step:</p>
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<p><strong>Step 1:</strong>Begin by grouping the digits of 792 starting from the right: 92 and 7.</p>
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<p><strong>Step 1:</strong>Begin by grouping the digits of 792 starting from the right: 92 and 7.</p>
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<p><strong>Step 2:</strong>Find the largest number whose square is<a>less than</a>or equal to 7. Here, 2 × 2 = 4, which is less than 7. Write 2 as the first digit of the<a>quotient</a>.</p>
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<p><strong>Step 2:</strong>Find the largest number whose square is<a>less than</a>or equal to 7. Here, 2 × 2 = 4, which is less than 7. Write 2 as the first digit of the<a>quotient</a>.</p>
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<p><strong>Step 3:</strong>Subtract 4 from 7, leaving a<a>remainder</a>of 3. Bring down the next pair of digits, 92, to make 392.</p>
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<p><strong>Step 3:</strong>Subtract 4 from 7, leaving a<a>remainder</a>of 3. Bring down the next pair of digits, 92, to make 392.</p>
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<p><strong>Step 4:</strong>Double the<a>divisor</a>2, getting 4, and determine a new digit n such that 4n × n ≤ 392. Choosing n = 7 gives 47 × 7 = 329.</p>
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<p><strong>Step 4:</strong>Double the<a>divisor</a>2, getting 4, and determine a new digit n such that 4n × n ≤ 392. Choosing n = 7 gives 47 × 7 = 329.</p>
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<p><strong>Step 5:</strong>Subtract 329 from 392, resulting in a remainder of 63.</p>
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<p><strong>Step 5:</strong>Subtract 329 from 392, resulting in a remainder of 63.</p>
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<p><strong>Step 6:</strong>Add a<a>decimal</a>point to the quotient and bring down two zeros, making the new<a>dividend</a>6300.</p>
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<p><strong>Step 6:</strong>Add a<a>decimal</a>point to the quotient and bring down two zeros, making the new<a>dividend</a>6300.</p>
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<p><strong>Step 7:</strong>Double the current quotient (27), making it 54. Find a new digit n such that 54n × n ≤ 6300. Here, n = 1 gives 541 × 1 = 541.</p>
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<p><strong>Step 7:</strong>Double the current quotient (27), making it 54. Find a new digit n such that 54n × n ≤ 6300. Here, n = 1 gives 541 × 1 = 541.</p>
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<p><strong>Step 8:</strong>Subtract 541 from 6300, getting a remainder of 5759. Continue this process to get more decimal places until you reach the desired precision.</p>
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<p><strong>Step 8:</strong>Subtract 541 from 6300, getting a remainder of 5759. Continue this process to get more decimal places until you reach the desired precision.</p>
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<p>The approximate square root of 792 is 28.14.</p>
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<p>The approximate square root of 792 is 28.14.</p>
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<h2>Square Root of 792 by Approximation Method</h2>
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<h2>Square Root of 792 by Approximation Method</h2>
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<p>The approximation method provides an easy way to estimate the square root of a number. Here’s how to approximate the square root of 792:</p>
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<p>The approximation method provides an easy way to estimate the square root of a number. Here’s how to approximate the square root of 792:</p>
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<p><strong>Step 1:</strong>Identify the nearest perfect squares around 792.</p>
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<p><strong>Step 1:</strong>Identify the nearest perfect squares around 792.</p>
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<p>The smallest perfect square less than 792 is 784 (28²) and the largest perfect square<a>greater than</a>792 is 841 (29²). Therefore, √792 lies between 28 and 29.</p>
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<p>The smallest perfect square less than 792 is 784 (28²) and the largest perfect square<a>greater than</a>792 is 841 (29²). Therefore, √792 lies between 28 and 29.</p>
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<p><strong>Step 2:</strong>Apply linear interpolation to approximate: (792 - 784) ÷ (841 - 784) = 8 ÷ 57 ≈ 0.14 Adding this to the lower bound of 28 gives 28 + 0.14 = 28.14.</p>
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<p><strong>Step 2:</strong>Apply linear interpolation to approximate: (792 - 784) ÷ (841 - 784) = 8 ÷ 57 ≈ 0.14 Adding this to the lower bound of 28 gives 28 + 0.14 = 28.14.</p>
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<p>Thus, the approximate square root of 792 is 28.14.</p>
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<p>Thus, the approximate square root of 792 is 28.14.</p>
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<h2>Common Mistakes and How to Avoid Them in the Square Root of 792</h2>
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<h2>Common Mistakes and How to Avoid Them in the Square Root of 792</h2>
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<p>Students often make errors while finding square roots, such as neglecting the negative square root or mishandling the long division method. Let's discuss some common mistakes in detail.</p>
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<p>Students often make errors while finding square roots, such as neglecting the negative square root or mishandling the long division method. Let's discuss some common mistakes in detail.</p>
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<h2>Download Worksheets</h2>
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<h3>Problem 1</h3>
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<h3>Problem 1</h3>
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<p>Can you help Max find the area of a square box if its side length is given as √792?</p>
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<p>Can you help Max find the area of a square box if its side length is given as √792?</p>
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<p>Okay, lets begin</p>
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<p>Okay, lets begin</p>
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<p>The area of the square is approximately 792 square units.</p>
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<p>The area of the square is approximately 792 square units.</p>
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<h3>Explanation</h3>
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<h3>Explanation</h3>
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<p>The area of a square is calculated as side².</p>
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<p>The area of a square is calculated as side².</p>
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<p>The side length is given as √792.</p>
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<p>The side length is given as √792.</p>
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<p>Area = (√792)² = 792 square units.</p>
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<p>Area = (√792)² = 792 square units.</p>
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<p>Therefore, the area of the square box is approximately 792 square units.</p>
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<p>Therefore, the area of the square box is approximately 792 square units.</p>
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<p>Well explained 👍</p>
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<p>Well explained 👍</p>
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<h3>Problem 2</h3>
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<h3>Problem 2</h3>
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<p>A square-shaped plot measuring 792 square meters is built; if each side measures √792, what will be the area of half of the plot?</p>
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<p>A square-shaped plot measuring 792 square meters is built; if each side measures √792, what will be the area of half of the plot?</p>
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<p>Okay, lets begin</p>
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<p>Okay, lets begin</p>
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<p>396 square meters</p>
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<p>396 square meters</p>
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<h3>Explanation</h3>
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<h3>Explanation</h3>
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<p>Since the plot is square-shaped, dividing the total area by 2 gives half the area.</p>
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<p>Since the plot is square-shaped, dividing the total area by 2 gives half the area.</p>
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<p>Dividing 792 by 2 = 396</p>
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<p>Dividing 792 by 2 = 396</p>
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<p>So, half of the plot measures 396 square meters.</p>
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<p>So, half of the plot measures 396 square meters.</p>
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<p>Well explained 👍</p>
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<p>Well explained 👍</p>
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<h3>Problem 3</h3>
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<h3>Problem 3</h3>
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<p>Calculate √792 × 5.</p>
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<p>Calculate √792 × 5.</p>
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<p>Okay, lets begin</p>
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<p>Okay, lets begin</p>
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<p>Approximately 140.71425</p>
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<p>Approximately 140.71425</p>
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<h3>Explanation</h3>
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<h3>Explanation</h3>
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<p>First, find the square root of 792, which is approximately 28.14285.</p>
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<p>First, find the square root of 792, which is approximately 28.14285.</p>
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<p>Multiply this by 5. 28.14285 × 5 = 140.71425</p>
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<p>Multiply this by 5. 28.14285 × 5 = 140.71425</p>
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<p>Well explained 👍</p>
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<p>Well explained 👍</p>
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<h3>Problem 4</h3>
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<h3>Problem 4</h3>
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<p>What will be the square root of (392 + 400)?</p>
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<p>What will be the square root of (392 + 400)?</p>
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<p>Okay, lets begin</p>
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<p>Okay, lets begin</p>
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<p>The square root is 28</p>
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<p>The square root is 28</p>
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<h3>Explanation</h3>
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<h3>Explanation</h3>
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<p>First, calculate the sum (392 + 400) = 792. Then, find the square root: √792 ≈ 28.</p>
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<p>First, calculate the sum (392 + 400) = 792. Then, find the square root: √792 ≈ 28.</p>
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<p>Therefore, the square root of (392 + 400) is approximately 28.</p>
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<p>Therefore, the square root of (392 + 400) is approximately 28.</p>
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<p>Well explained 👍</p>
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<p>Well explained 👍</p>
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<h3>Problem 5</h3>
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<h3>Problem 5</h3>
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<p>Find the perimeter of a rectangle if its length ‘l’ is √792 units and the width ‘w’ is 45 units.</p>
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<p>Find the perimeter of a rectangle if its length ‘l’ is √792 units and the width ‘w’ is 45 units.</p>
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<p>Okay, lets begin</p>
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<p>Okay, lets begin</p>
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<p>The perimeter of the rectangle is approximately 146.2857 units.</p>
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<p>The perimeter of the rectangle is approximately 146.2857 units.</p>
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<h3>Explanation</h3>
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<h3>Explanation</h3>
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<p>Perimeter of a rectangle = 2 × (length + width)</p>
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<p>Perimeter of a rectangle = 2 × (length + width)</p>
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<p>Perimeter = 2 × (√792 + 45) = 2 × (28.14285 + 45) = 2 × 73.14285 ≈ 146.2857 units.</p>
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<p>Perimeter = 2 × (√792 + 45) = 2 × (28.14285 + 45) = 2 × 73.14285 ≈ 146.2857 units.</p>
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<p>Well explained 👍</p>
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<p>Well explained 👍</p>
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<h2>FAQ on Square Root of 792</h2>
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<h2>FAQ on Square Root of 792</h2>
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<h3>1.What is √792 in its simplest form?</h3>
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<h3>1.What is √792 in its simplest form?</h3>
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<p>The prime factorization of 792 is 2 × 2 × 2 × 3 × 3 × 11, so the simplest form of √792 is √(2³ × 3² × 11).</p>
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<p>The prime factorization of 792 is 2 × 2 × 2 × 3 × 3 × 11, so the simplest form of √792 is √(2³ × 3² × 11).</p>
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<h3>2.Mention the factors of 792.</h3>
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<h3>2.Mention the factors of 792.</h3>
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<p>Factors of 792 are 1, 2, 3, 4, 6, 8, 9, 11, 12, 18, 22, 24, 33, 36, 44, 66, 72, 88, 99, 132, 198, 264, 396, and 792.</p>
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<p>Factors of 792 are 1, 2, 3, 4, 6, 8, 9, 11, 12, 18, 22, 24, 33, 36, 44, 66, 72, 88, 99, 132, 198, 264, 396, and 792.</p>
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<h3>3.Calculate the square of 792.</h3>
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<h3>3.Calculate the square of 792.</h3>
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<p>The square of 792 is obtained by multiplying the number by itself: 792 × 792 = 627,264.</p>
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<p>The square of 792 is obtained by multiplying the number by itself: 792 × 792 = 627,264.</p>
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<h3>4.Is 792 a prime number?</h3>
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<h3>4.Is 792 a prime number?</h3>
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<h3>5.792 is divisible by?</h3>
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<h3>5.792 is divisible by?</h3>
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<p>792 is divisible by several numbers, including 1, 2, 3, 4, 6, 8, 9, 11, 12, 18, 22, 24, 33, 36, 44, 66, 72, 88, 99, 132, 198, 264, 396, and 792.</p>
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<p>792 is divisible by several numbers, including 1, 2, 3, 4, 6, 8, 9, 11, 12, 18, 22, 24, 33, 36, 44, 66, 72, 88, 99, 132, 198, 264, 396, and 792.</p>
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<h2>Important Glossaries for the Square Root of 792</h2>
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<h2>Important Glossaries for the Square Root of 792</h2>
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<ul><li><strong>Square root:</strong>The square root of a number is a value that, when multiplied by itself, gives the original number. For example, the square root of 9 is 3.</li>
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<ul><li><strong>Square root:</strong>The square root of a number is a value that, when multiplied by itself, gives the original number. For example, the square root of 9 is 3.</li>
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</ul><ul><li><strong>Irrational number:</strong>An irrational number cannot be expressed as a simple fraction. The decimal goes on forever without repeating.</li>
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</ul><ul><li><strong>Irrational number:</strong>An irrational number cannot be expressed as a simple fraction. The decimal goes on forever without repeating.</li>
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</ul><ul><li><strong>Approximation:</strong>The process of finding a value that is close enough to the right answer, usually within some small error.</li>
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</ul><ul><li><strong>Approximation:</strong>The process of finding a value that is close enough to the right answer, usually within some small error.</li>
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</ul><ul><li><strong>Interpolation:</strong>A method of estimating values between two known values.</li>
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</ul><ul><li><strong>Interpolation:</strong>A method of estimating values between two known values.</li>
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</ul><ul><li><strong>Perfect square:</strong>A number that is the square of an integer. For example, 16 is a perfect square because it is 4 squared.</li>
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</ul><ul><li><strong>Perfect square:</strong>A number that is the square of an integer. For example, 16 is a perfect square because it is 4 squared.</li>
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</ul><p>What Is Algebra? 🧮 | Simple Explanation with 🎯 Cool Examples for Kids | ✨BrightCHAMPS Math</p>
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</ul><p>What Is Algebra? 🧮 | Simple Explanation with 🎯 Cool Examples for Kids | ✨BrightCHAMPS Math</p>
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<h2>Jaskaran Singh Saluja</h2>
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<h2>Jaskaran Singh Saluja</h2>
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<h3>About the Author</h3>
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<h3>About the Author</h3>
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<p>Jaskaran Singh Saluja is a math wizard with nearly three years of experience as a math teacher. His expertise is in algebra, so he can make algebra classes interesting by turning tricky equations into simple puzzles.</p>
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<p>Jaskaran Singh Saluja is a math wizard with nearly three years of experience as a math teacher. His expertise is in algebra, so he can make algebra classes interesting by turning tricky equations into simple puzzles.</p>
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<h3>Fun Fact</h3>
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<h3>Fun Fact</h3>
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<p>: He loves to play the quiz with kids through algebra to make kids love it.</p>
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<p>: He loves to play the quiz with kids through algebra to make kids love it.</p>