The correct Answer is:=6×12=72. To find the cube root of 216×1728, we will follow these steps: Step 1: Prime Factorization of 216First, we need to find the prime factorization of 216. 1. Divide 216 by 2: 216÷2=1082. Divide 108 by 2: 108÷2=543. Divide 54 by 2: 54÷...
To find the cube root of 216, we will use the prime factorization method. Here’s a step-by-step solution:Step 1: Prime Factorization of 216 First, we need to find the prime factors of 216.- Start by dividing 216 by the
Cube root of a number is the reverse process of finding the cube of a number. Learn how to find the cube root using prime factorization method along with solved examples at BYJU'S.
Thus cube root of 5832=2×3×3=18 Hence 3√5832=18 Suggest Corrections 3 Similar questions Q. find cube root by estimation 5832 Q. Find the cube root of 5832 by prime factorisation method. Q. Find the cube root of the given number through estimation: 5832 Q. Estimate cube root of ...
What is the Cube Root of 300? - How to Calculate the value of cube root of 300, FAQs, Tricks to solve problems on cube root 300 with Solved Examples, and more.
Find the Domain f(t) = cube root of 2t-1 ( f(t)=√[3](2t-1)) 相关知识点: 试题来源: 解析 The domain of the expression is all real numbers except where the expression is undefined. In this case, there is no real number that makes the expression undefined. Interval Notation:...
Thecube rootis the reverse of the cube of a number and is denoted by ∛. For example, ∛216, that is, the cube root of 216 = 6 because when 6 is multiplied thrice with itself, it gives 216. In other words, since 63= 216, we have ∛216 = 6. ...
Differentiate using the Quotient Rule which states that ( d/(dt)[(f(t))/(g(t))]) is ( (g(t)d/(dt)[f(t)]-f(t)d/(dt)[g(t)])/((g(t))^2)) where ( f(t)=t^(1/3)) and ( g(t)=t-3).( ((t-3)d/(dt)[t^(1/3)]-t^(1/3)d/(dt)[t-3])/((...
Knowledge Check Find the cube roots of A−343 B−4913 C10648 Dn/aSubmit Find the cube root of 216 View Solution Find the cube root of 621 View Solution Find the cube root of 2744. View Solution Find the cube root of 216. View Solution Find the cube root of 1728 . View Solution...
Therefore, the real root of the equation x3− 999 = 0 is for x = ∛999 = 9.9967. Example 3: What is the value of ∛999 ÷ ∛(-999)? Solution: The cube root of -999 is equal to the negative of the cube root of 999. ...