A: 13
B: 5
C: 7
D: 13
举一反三
- 设f1(x)和f2(x)为二阶常系数线性齐次微分方程y″+py′+q=0的两个特解,若由f1(x)和f2(x)能构成该方程的通解,下列哪个方程是其充分条件?() A: f1(x)f′2(x)-f2(x)f′1(x)=0 B: f1(x)f′2(x)-f2(x)f′1(x)≠0 C: f1(x)f′2(x)+f2(x)f′1(x)=0 D: f1(x)f′2(x)+f2(x)f′1(x)≠0
- 设f1(x)和f2(x)为二阶常系数线性齐次微分方程y''+py'+q=0的两个特解, 若由f1(x)和f2(x)能构成该方程的通解,下列哪个方程是其充分条件?() A: f1(x)*f'2(x)-f'1(x)*f2(x)=0 B: f1(x)*f'2(x)-f'1(x)*f2(x)≠0 C: f1(x)*f'2(x)+f'1(x)*f2(x)=0 D: f1(x)*f'2(x)+f'1(x)*f2(x)≠0
- 已知函数f(x)满足:f(a+b)=f(a)•f(b),f(1)=2,则f2(1)+f(2)f(1)+f2(2)+f(4)f(3)+f2(3)+f(6)f(5)+f2(4)+f(8)f(7)=______.
- 已知函数f(x)满足:f(p+q)=f(p)f(q),f(1)=3,则f2(1)+f(2)f(1)+f2(2)+f(4)f(3)+f2(3)+f(6)f(5)+f2(4)+f(8)f(7)等于( )
- 已知\(f(x)\)在节点1,2处的函数值为\(f(1) = 2,f(2) = 3\) ,在节点1,2处的导数值为\(f'(1) = 0,f'(2) = - 1\) ,求 f(x) 两点三次埃米特插值多项式 A: \(H(x) = - 3{x^3} + 13{x^2} - 17x + 6\) B: \(H(x) = - 3{x^3} + 13{x^2} - 17x + 3\) C: \(H(x) = - 3{x^3} + 13{x^2} - 17x +7\) D: \(H(x) = - 3{x^3} + 13{x^2} - 17x + 9\)
内容
- 0
设f(x)=xx+1,定义f1(x)=f(x),f2(x)=f1(f(x)),f3(x)=f2(f(x)),…,fn(x)=fn-1(f(x)),(n≥2,n∈N)则f100(x)=1的解为x=______.
- 1
已知函数f(x)=2根号sin平方x-sin(2x-π/3)
- 2
将函数\(f(x)=\sin^4 x\)展开成Fourier级数为 ____ . A: \(f(x) = \frac{3}{8}-\frac{1}{2}\cos 2x +\frac{1}{8}cos 4x\) B: \(f(x) = \frac{1}{4}-\frac{1}{2}\cos x +\frac{3}{8}cos 4x\) C: \(f(x) = \frac{1}{4}-\frac{1}{2}\sin 2x -\frac{3}{8}cos 4x\) D: \(f(x) = \frac{3}{8}-\frac{1}{2}\sin x -\frac{1}{8}cos 4x\)
- 3
17e0b849d3a4a3b.jpg,计算[img=19x34]17e0ab14a855463.jpg[/img]的实验命令为( ). A: syms x; f=diff((1+sin(x)^2)/cos(x),1)f=2*sin(x) + (sin(x)*(sin(x)^2 + 1))/cos(x)^2 B: f=diff((1+sinx^2)/cosx,1)f=1/2/x^(1/2)/(1-x)^(1/2) C: syms x;f=diff((1+sinx^2)/cosx,1)f=2*sin(x) + (sin(x)*(sin(x)^2 + 1))/cos(x)^2
- 4
【单选题】如图所示,函数f(x)=sin(ωx+φ) 的图象与二次函数y=- x 2 + x+1的图象交于点A(x 1 ,0)和B(x 2 ,1),则f(x)的解析式为() A. f(x)=sin B. f(x)=sin C. f(x)=sin D. f(x)=sin