such that there exists a positive real number b such that all the roots of the polynomial x3−ax2+bx−a are real. In fact, for this value of a the value of b is unique. What is the value of b?( ) A.8 B.9 C.10 D.11 E.12 相关知识点: 试题...
otherwise one would get numbers less than the smallest positive real number, which contradicts to the definition of the smallest positive real number. N.B. the conclusion is conducted out in terms of assuming the existence
which subtracts the smallest positive real number equals the smallest positive real number. The difference between the second greater positive real number and smallest positive real number could not be any other positive real number greater than the smallest positive ...
5. Find the smallest real number M such that (∑limits_(k=1)^Ma_(k+1)(a_k+a_(k+1)+a_(k+2)))()M for all positive real numbers a_1,a_2,⋅ ⋅ ⋅ ,a_(99)⋅ (a_(100)=a_1,a_(101)=a_2) 相关知识点:
What is the smallest positive integer n for which(1+i)2n=(1−i)2n? View Solution The smallest positive integral value of n for which(1+√3i)n2is real is View Solution Find the smallest positive integer value ofnfor which(1+i)n(1−i)n−2is a real number. ...
Given a positive numberxand its reciprocal valuey=1x, we have a sum function: {eq}S (x, y) = x + y\S (x) = x +... Learn more about this topic: Optimization and Differentiation from Chapter 10/ Lesson 5 30K Optimization is the process of applying mat...
In Brown (2006), it was shown that almost all numbers are ordinary and if \\\(E_{x}\\\) denotes the set of extraordinary numbers less than or equal to a positive real number \\\(x\\\), \\\(|E_{x}|=o\\\left( \\\frac{x}{2^{(\\\log (\\\log x))^{\\\delta }}}...
This seems to give fairly sensible results for all positive inputs. What should the output be if it's called with numerator = 5 and denominator = 0? (By "should" I mean, what woud the result be if division inJavaworked the way you describe?) ...
To solve the problem of finding the smallest number which, when increased by 17, is exactly divisible by both 468 and 520, we can follow these steps:Step 1: Find the LCM of 468 and 520To find the least common multiple (L
We prove that for every field k and every positive integer n there exists an absolutely simple n-dimensional abelian variety over k. We also prove an asymp... EW Howe,JZ Hui - 《Journal of Number Theory》 被引量: 63发表: 2002年 The structure of some minus class groups, and Chinburg'...