  Centrale des maths - centraledesmaths.uregina.ca  Dilemmes & doutes    « D & D »    Sujet: hcf   nouvelle recherche

9 articles trouvés pour ce sujet.    Page1/1            HCF and LCM 2015-09-05 Ally pose la question :the HCF of the two numbers is 3, and the LCM is 15. what could the two numbers be?Penny Nom lui répond.     HCF and LCM 2013-05-15 Kelly pose la question :If HCF and LCM of two numbers is 7 and 20 respectively, then the number/s is/are.Penny Nom lui répond.     HCF 2009-08-03 Nazrul pose la question :If (x+ a) be the H,C.F. of x^2+px+q and x^2+mx+n, prove that (p-m)a=q-nStephen La Rocque lui répond.     Express the HCF of 1232 and 573 as 1232x + 573y = 1 2009-02-22 Anonymous pose la question :Express the HCF of 1232and 573 as 1232x + 573y = 1.Victoria West lui répond.     The product of two integers their LCM and their HCF 2009-02-15 Anonymous pose la question :Two numbers have LCM = 60. If their product is 180, what is their HCF?Harley Weston lui répond.     Find two numbers with HCF of 3 and LCM of 180 2008-02-07 matthew pose la question :Hi, please help me with this, Find two numbers with HCF of 3 and LCM of 180Stephen La Rocque and Penny Nom lui répond.     LCM and HCF 2006-10-28 Henry pose la question :Is there a unique solution to the question: If the LCM and HCF of two numbers are 180 and 15 respectively, what are the two numbers? I got 45 and 60. I got a feeling there are others.Stephen La Rocque lui répond.     HCF and LCM 2006-08-05 Bharath pose la question :The HCF and LCM of polynomials p(x) and q(x) are h and l respectively and p(x) + q(x) = h + l, show that [p(x)]2 + [q(x)]2 = h2 + l2Stephen La Rocque lui répond.     The HCF and LCM of polynomials 2003-05-20 Charanpal pose la question :Question: Find the HCF and LCM of the polynomials given below. Verify that he productof these HCF and LCM differs from the product of the polynomials, if at all, by a factor of -1 1-x2 and x3 -1 1 - x2 and x4 - 1 Penny Nom lui répond.      Page1/1    Centrale des maths reçoit une aide financière de l’Université de Regina et de The Pacific Institute for the Mathematical Sciences.    Qui sommes-nous :: carte du site :: our english site