结果一 题目 Which of the following equations has no integer solution( ).A.x2+1=0B.x2−1=0C.x3+1=0D.x3−1=0 答案 A相关推荐 1Which of the following equations has no integer solution( ).A.x2+1=0B.x2−1=0C.x3+1=0D.x3−1=0 ...
(i)∴3/2=3/2-1/2-1/2=1/6Therefore, the given sets of lines are parallel to each other. Therefore, they will not intersect each other and thus, there will not be any solution for these equations.(ii)(a_2+b_1)/(a_2)=b/a=1/(-2)=b/(-2a)=1/2(a_1)/(a_2)≠(b_1...
Solving Equations:An equation is a statement of equality between two sides. The basic aspect of an equation is that equality is satisfied. This is precisely the essence of an equation: Finding the value or values of the unknown for which the equation is satisfied...
To solve the problem, we need to determine the value of|α|for which the given system of equations has no solutions. The system of equations is: 1.αx+y+z=α−1 2.x+αy+z=α−1 3.x+y+αz=α−1 Step 1: Write the system in matrix form ...
To write a pair of linear equations that has a unique solution of x=−1 and y=3, we can follow these steps: Step 1: Identify the solution pointThe unique solution given is (x,y)=(−1,3). Step 2: Formulate the equationsWe can start by using the point-slope form of a linear...
百度试题 结果1 题目Which one of the following equations has solution 0? () A. arctan1=x B. arccos0=x C. arcsin0=x 相关知识点: 试题来源: 解析 C 反馈 收藏
Which of the following equations has 3 as the solution? (a) -2b = 6 (b) 4a - 5 = 12 (c) 5y = y + 8 (d) z - 15 = -12 What is the solution of the equation -3x^2 + 6x = -12? What is the solution to the equation x^2 ...
anew we a in house live 新我们a在房子里活[translate] aObjective: To relate the solution of quadratic equations to the geometry upon which those equations are originally based. 宗旨: 与那些等式最初根据的几何关系二次方程的解答。[translate]...
Which statement is true about a system of equations with no solution? A. 向儿世处增称象军划且现治四京切受记向儿世处增称象军划且现治四京切受记The equations represent the same line.向儿世处增称象军划且现治四京切受记向儿世处增称象军划且现治四京切受记 B. 地群同接引地群同接引The ...
Does there exist a kind of fractional derivatives such that the corresponding Cauchy problems have exponentially asymptotical solution? The answer is positive. We can introduce a new derivative with exponential kernel such that the associate solution is exponentially asymptotic.Li, Changpin...