What is the square root of 1444? The value of the square root of 1444 is approximately equal to 38. Visit BYJU’S to learn how to find the square root of 1444 using the long division and prime factorization method.
Is Square Root of 144 Rational or Irrational?A rational number is defined as a number that can be represented in the ratio of two integers, that is, p/q where q ≠ 0. 12 and -12 can be written as 12/1 and -12/1 Both numbers can be expressed in the form of rational numbers....
If 'a' is the square root of 'b', it means that a × a = b. The square of any number is always a positive number, so every number has two square roots, one of a positive value, and one of a negative value. For example, both 2 and -2 are square roots of 4. However, in ...
Square rootof a number is a value, which on multiplication by itself, gives the original number. The square root is an inverse method of squaring a number. Hence,squares and square rootsare related concepts. Suppose x is the square root of y, then it is represented as x=√y, or we ...
112(1)If 3x+5 and x +7 are the square roots of the same number,find the value of x.(2)If 3x+5 and x+7 are the cube root of the same number,find the value of x.12 (1) If 3x+5 and x+7 are the square roots of the same number,find the value of x. (2)If 3x +5 ...
百度试题 结果1 题目Find the Roots (Zeros) f(x) = square root of x-4( f(x)=√(x-4)) 相关知识点: 试题来源: 解析 Set(√(x-4)) equal to ( 0). (√(x-4)=0) Solve for ( x). ( x=4) 反馈 收藏
百度试题 结果1 题目Find the square roots of 36(cos20°+isin20°). 相关知识点: 试题来源: 解析 6(cos10°+isin10°), 6(cos190°+isin190°) 6(cos10°+isin10°), 6(cos190°+isin190°)反馈 收藏
Step 2: Combine the Two TermsNow we can combine the two terms:−2+23i41+−2−23i41=(−2−2)+(23i−23i)41=−441 Step 3: Find the Square RootNow we need to find the square root of −441:√−441=√−1⋅√441=i⋅2√41=2i√41Thus, the square roots are:...
The square root of 289 is 17; the square root of 784 is 28. Perfect squares can only have 0, 1, 4, 5, 6, 9 on the ones place. We can filter some of the numbers with the above pattern. Then we can filter others by finding the perfect squares near them....
The correct Answer is:(i) ±(4+3i) (ii) (4−3i) (iii) ±(3−4i) (iv) ±(3+4i) To find the square roots of the complex numbers given in the question, we will use the formula for the square root of a complex number z=a+bi. The square root can be expressed in the ...