Table of Contents
What is 150 square root simplified?
5√6
The simplified form of √150 in its radical form is 5√6.
What is the square root of 147 simplified?
x = √147 = 12.124 feet.
What is the general form of 149?
149 in Roman numerals is CXLIX. To convert 149 in Roman Numerals, we will write 149 in the expanded form, i.e. 149 = 100 + (50 – 10) + (10 – 1) thereafter replacing the transformed numbers with their respective roman numerals, we get 149 = C + (L – X) + (X – I) = CXLIX.
IS 149 a perfect square?
The square root of 149 is an irrational number. The number 149 is not a perfect square.
How do you simplify 150?
Algebra Examples Rewrite 150 as 52⋅6 5 2 ⋅ 6 . Factor 25 25 out of 150 150 .
What is the simplest form of 147?
147100 is already in the simplest form. It can be written as 1.47 in decimal form (rounded to 6 decimal places)….Reduce 147/100 to lowest terms
- Find the GCD (or HCF) of numerator and denominator. GCD of 147 and 100 is 1.
- 147 ÷ 1100 ÷ 1.
- Reduced fraction: 147100. Therefore, 147/100 simplified to lowest terms is 147/100.
Is 149 a perfect square?
There is no integer that you can multiply by itself that will make 149. Furthermore, the square root of 149 is not an integer. Thus, 149 is NOT a square number. The answer to the question: “Is 149 a square number?” is No. The answer to the question: “Is 149 a perfect square?” is also No.
Is 149 a rational number?
The number 149 is a rational number if 149 can be expressed as a ratio, as in RATIOnal. A quotient is the result you get when you divide one number by another number. For 149 to be a rational number, the quotient of two integers must equal 149.
What is the principal square root of 144?
Square root of 144 is 12. It is termed as perfect square since 12 is a rational number Square root of 144 is 12. It is termed as perfect square since 12 is a rational number
How do you simplify the square root of a number?
Simplifying a Square Root by Factoring Understand factoring. Divide by the smallest prime number possible. Rewrite the square root as a multiplication problem. Repeat with one of the remaining numbers. Finish simplifying by “pulling out” an integer. Multiply integers together if there are more than one.