Given that a+b=216, the HCF of a and b is 18. If a. 相关知识点: 试题来源: 解析 18,198 or 90,126.. 本题过程如下: ①d=18; ②设a=18x,b=18y,则x、y互质,即(x,y)=1; ③题目条件变为18x+18y=216,即x+y=12; ④和为12,还互质的两数,只能是1、11或5、7; ⑤对应本...
If (x+k) is the HCF of (x2+ax+b) and (x2+px+q), then the value of k is Aq−bp+q Bq−bp−a Cb−qp−q Dq−ba−pSubmit Question 2 - Select One If (x+k) is the HCF of (x2+ax+b) and (x2+px+q), then the value of k is Aa−bp+q Bq−bp−...
14.The product of the HCF and LCM of two numbers is384.If one number is 8 more than the othernumber,then the sum of the two numbers is(A)48(B)40(C)36(D)24(E)1814.The product of the HCF and LCM of two numbers is 384.If one number is 8 more than the other number,then the...
1.Find the HCF of 657 and 963 using Euclid's Division Algorithm: - Start with the larger number, 963, and divide it by the smaller number, 657. -963=657×1+306(Here, 306 is the remainder) 2.Continue the process: - Now take 657 and divide it by the remainder 306. ...
百度试题 结果1 题目The HCF of two natural numbers is 12 while the LCM is 120. If one of the number is 24, find the other number. 相关知识点: 试题来源: 解析 60 (a,b)×[a,b]=a×b,所以12×120÷24=60.反馈 收藏
If the heart has no place to perch on, you will always be a drifter no matter where you are. 心若没有栖息的地方,到哪里都是在流浪。 û收藏 11 评论 ñ8 评论 o p 同时转发到我的微博 按热度 按时间 正在加载,请稍候......
If you're single, make the best of it. It's not because you're not good enough for anyone, but it means no one is good enough for you yet.如果你还是单身,就好好享受这一切。你单身不是因为你不够好,而是说明目前还没有人配得上你。 ...
number is 8 more than the othernumber,then the sum of the two numbers is(A)48(B)40(C)36(D)24(E)1814.The product of the HCF and LCM of two numbers is 384.If one number is 8 more than the other number,then the sum of the two numbers is (A)48 (B)40 (C)36 (D)24 (E...
If (x−k) is the HCF of 3x2+14x+16 and (6x3+11x2−4x−4), then the value of k Video Solution | ShareSave Answer Step by step video & image solution for If (x-k) is the HCF of 3x^2+14x+16 and (6x^3+11x^2-4x-4), then the value of k by Maths experts to hel...
To solve the problem, we need to find the values of a and b given the polynomials: f(x)=(x−1)(x2+3x+a)g(x)=(x+2)(x2+2x+b) We know that the highest common factor (HCF) of these polynomials is: HCF=x2+x−2 Step 1: Factor the HCF First, we can factor the HCF ...