Search results
Results from the WOW.Com Content Network
it is a rational number. Step-by-step explanation: it is a rational number because an irrational number cannot be written in the form of p/q . 1/6 can be written in the p/q form so it is a rational number
Let and represent two rational numbers. This means a, b, c, and d are irrational numbers v, and b and d are not 0. The product of the numbers is ас where bd' ас bd is not 0. Both aC and bd are Choose... and bd is not 0. Because bd is the ratio of two Choose... the product is a rational number. Next >
Rational numbers are all numbers that can be expressed as fractions of integers, as long as the denominator is not zero. If s and t are integers, s t would count as a rational number as long as t≠0. The set of rational numbers includes all integers and whole numbers as well, as they can all also be expressed as fractions where 1 is the ...
A real number of the form p/2", where p is an integer and n is a nonnegative integer, is known as a dyadic rational number. Prove that there is a dyadic rational number between any two distinct real numbers.
Let the rational number be : A Reciprocal of this rational number : 1/A As per statement A + 1/A = 13/6 A^2 + 1 = 13A/6
c Evaluate the following mathematical expression, and express the answer to the correct number of significant digits. 3.47 x 103 + 2.21 × 10² + 1.14 × 10' Submit d Evaluate the following mathematical expression, and express the answer to the correct number of significant digits. 2.7991 × 10-6 3.60 x 106
Reason: Because 3/5 is a rational number, adding 0 to it does not affect the outcome (Statement - I). Statement - II's explanation of why adding 0 to every rational number does not affect its value, "0 is the additive identity," provides the answer to this question. #SPJ1. brainly.in/question/57170024. brainly.in/question/45625130
An irrational number is defined as a number that has a non-terminating and non-repeating decimal expansion and cannot be expressed in the form of p/q, where q≠0. (2 +8) is an irrational number as is an irrational number. Hence, (6+5√ 3 ) - (4-3√ 3) is (b)an irrtaional number.
A: 4×5=2×5=25 , so this is an irrational number.0.85=8599 , so this is a rational number Q: Let n be a real number and let e be a positive real number. Determine whether there exists a real…
If x and y are rational numbers, then xy is a rational number. Proof: Let x and y be rational numbers. By the definition of rational numbers, x = nd y = for some integers a and b. We must show that xy is rational, that is, xy = T some integers m and n. Iculating ry, we have a a xy by substitution, (1 a2 by algebra. 62 = a? and m = b?.