Square Root Of 9150625 In Simplest Radical Form
Simplify the square root of 9150625 to its lowest radical form.ANSWER: 3025√1
3025√1 is in the lowest radical form.
Simplified Radical Form of √9150625
One of the main facts used to simplify square roots is that the square root of a product is equal to the product of square roots: √(x×y) = √x×√y
Explanation:
When we find square root of any number, we take one number from each pair of the same numbers from its prime factorization and we multiply them.
Step 1: List Factors
To simplify √9150625, we need to divide into factors.
√9150625 = √5 x √5 x √5 x √5 x √11 x √11 x √11 x √11Step 2: List Perfect Squares
1 is a perfect square and divides 9150625
25 is a perfect square and divides 9150625
121 is a perfect square and divides 9150625
625 is a perfect square and divides 9150625
3025 is a perfect square and divides 9150625
14641 is a perfect square and divides 9150625
75625 is a perfect square and divides 9150625
366025 is a perfect square and divides 9150625
9150625 is a perfect square and divides 9150625
Step 3: Divide To Perfect Square
Divide 9150625 by the largest perfect square you found in the previous step:
Step 4: Calculate The Square Root
Calculate the square root of the largest perfect square:
Final Step :
Put Steps 3 and 4 together to get the square root of 9150625 in its simplest form: 3025√1
How do you simplify √9150625
The general approach is to first check if it is a perfect square. If so, you have the answer. If it is not a perfect square, see if any of its factors are perfect squares, or can be combined to make square numbers.
Find the lowest prime number that can divide 9150625. Divide 9150625 repeatedly using the long division method till you reach 1.
A pair of factor 'twins' under a square root sign (radical) form a single factor outside of it.
Factors that do not have a twin remain under the radical. Multiply them back together and leave them in there.
So, the answer is 3025√1.
Simplified Decimal Form of √9150625
The square root of 9150625 is approximately 3025 when expressed in decimal form and you can find additive inverse of a decimal number.
Calculation Table:
Square Root | Answer | Calculation |
---|---|---|
√52 | 2√13 | √2 x √2 x √13 |
√98 | 7√2 | √2 x √7 x √7 |
√72 | 6√2 | √2 x √2 x √2 x √3 x √3 |
√243 | 9√3 | √3 x √3 x √3 x √3 x √3 |
√254 | Square root of 254 is the simplest radical form. | √2 x √127 |
√803 | Square root of 803 is the simplest radical form. | √11 x √73 |
√5727 | Square root of 5727 is the simplest radical form. | √3 x √23 x √83 |
√8087 | Square root of 8087 is the simplest radical form. | √8087 |
√7352 | 2√1838 | √2 x √2 x √2 x √919 |