设随机变量X具有对称的概率密度,即f(-x)=f(x),则对任意a>0,P(|X|>a)=______. A: 1-2F(a) B: 2F(a)-1 C: 2-F(a) D: 2[1-F(a)]
设随机变量X具有对称的概率密度,即f(-x)=f(x),则对任意a>0,P(|X|>a)=______. A: 1-2F(a) B: 2F(a)-1 C: 2-F(a) D: 2[1-F(a)]
设随机变量X的概率密度和分布函数分别是f(x)和F(x),且f(x)=f(-x),则对任意实数a,有F(-a)=() A: 1/2-F(a) B: 1/2+F(a) C: 2F(a)-1 D: 1-F(a)
设随机变量X的概率密度和分布函数分别是f(x)和F(x),且f(x)=f(-x),则对任意实数a,有F(-a)=() A: 1/2-F(a) B: 1/2+F(a) C: 2F(a)-1 D: 1-F(a)
设函数f(x)=a|x|(a>0),且f(2)=4,则( ) A: f(-1)>f(-2) B: f(1)>f(2) C: f(2)<f(-2) D: f(-3)>f(-2)
设函数f(x)=a|x|(a>0),且f(2)=4,则( ) A: f(-1)>f(-2) B: f(1)>f(2) C: f(2)<f(-2) D: f(-3)>f(-2)
设f(x)=x2+bx+c且f(0)=f(2),则( ) A: f(-2)<c<f(32) B: f(32)<c<f(-2) C: f(32)<f(-2)<c D: c<f(32)<f(-2)
设f(x)=x2+bx+c且f(0)=f(2),则( ) A: f(-2)<c<f(32) B: f(32)<c<f(-2) C: f(32)<f(-2)<c D: c<f(32)<f(-2)
f(x)=x2+bx+c,x∈R,有f(2+x)=f(2-x),则( ) A: f(1)<f(2)<f(4) B: f(2)<f(4)<f(1) C: f(4)<f(2)<f(1) D: f(2)<f(1)<f(4) E: f(1)<f(4)<f(2)
f(x)=x2+bx+c,x∈R,有f(2+x)=f(2-x),则( ) A: f(1)<f(2)<f(4) B: f(2)<f(4)<f(1) C: f(4)<f(2)<f(1) D: f(2)<f(1)<f(4) E: f(1)<f(4)<f(2)
已知\( y = {f^2}(x) \),假设\( f(u) \)二阶可导,则 \( y'' \)为( ). A: \( 2{[f'(x)]^2} + 2f(x)f'(x) \) B: \( 2[f'(x)] + 2f(x)f''(x) \) C: \( 2{[f'(x)]^2} + 2f(x)f''(x) \) D: \( 2{[f'(x)]^2} + f(x)f''(x) \)
已知\( y = {f^2}(x) \),假设\( f(u) \)二阶可导,则 \( y'' \)为( ). A: \( 2{[f'(x)]^2} + 2f(x)f'(x) \) B: \( 2[f'(x)] + 2f(x)f''(x) \) C: \( 2{[f'(x)]^2} + 2f(x)f''(x) \) D: \( 2{[f'(x)]^2} + f(x)f''(x) \)
【单选题】设 f ( x ) 是可导函数, 则 lim Δ x → 0 f 2 ( x + △ x ) − f 2 ( x ) △ x = ()。 A. [ f ′ ( x ) ] 2 " role="presentation"> [ f ′ ( x ) ] 2 B. 2 f ′ ( x ) " role="presentation"> 2 f ′ ( x ) C. 2 f ( x ) f ′ ( x ) " role="presentation"> 2 f ( x ) f ′ ( x ) " role="presentation"> 2 f ( x ) f ′ ( x ) x ) 2 f ( x ) f ′ ( x ) " role="presentation"> f ( x ) f ′ ( x ) D. 不存在;
【单选题】设 f ( x ) 是可导函数, 则 lim Δ x → 0 f 2 ( x + △ x ) − f 2 ( x ) △ x = ()。 A. [ f ′ ( x ) ] 2 " role="presentation"> [ f ′ ( x ) ] 2 B. 2 f ′ ( x ) " role="presentation"> 2 f ′ ( x ) C. 2 f ( x ) f ′ ( x ) " role="presentation"> 2 f ( x ) f ′ ( x ) " role="presentation"> 2 f ( x ) f ′ ( x ) x ) 2 f ( x ) f ′ ( x ) " role="presentation"> f ( x ) f ′ ( x ) D. 不存在;
设f(x)为连续函数,F(t)=,则F’(2)=()。 A: f(2) B: 2f(2) C: -f(2) D: 0
设f(x)为连续函数,F(t)=,则F’(2)=()。 A: f(2) B: 2f(2) C: -f(2) D: 0
设f(x)为连续函数,F(t)=f(x)dx,则F’(2)=()。 A: 2f(2) B: f(2) C: -f(2) D: 0
设f(x)为连续函数,F(t)=f(x)dx,则F’(2)=()。 A: 2f(2) B: f(2) C: -f(2) D: 0
已知\( y = f({x^2}) \),假设\( f(u) \)二阶可导,则\( y'' \)为( ). A: \( 4{x^2}f''({x^2}){\rm{ + }}2f'({x^2}) \) B: \( {x^2}f''({x^2}){\rm{ + }}2f'({x^2}) \) C: \( 4{x^2}f''({x^2}){\rm{ + }}f'({x^2}) \) D: \( {x^2}f''({x^2}){\rm{ + }}f'({x^2}) \)
已知\( y = f({x^2}) \),假设\( f(u) \)二阶可导,则\( y'' \)为( ). A: \( 4{x^2}f''({x^2}){\rm{ + }}2f'({x^2}) \) B: \( {x^2}f''({x^2}){\rm{ + }}2f'({x^2}) \) C: \( 4{x^2}f''({x^2}){\rm{ + }}f'({x^2}) \) D: \( {x^2}f''({x^2}){\rm{ + }}f'({x^2}) \)