已知关于X的方程X^2-KX+K^2+N=0有两个不相等的实数根X1 X2 且(2X1+X2)^2-8(2X1+X2)+15=0 1.求证:N小于0 2.试用含K的代数式表示X1 3.当N=-3时,求K的值
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已知关于X的方程X^2-KX+K^2+N=0有两个不相等的实数根X1 X2 且(2X1+X2)^2-8(2X1+X2)+15=0 1.求证:N小于0 2.试用含K的代数式表示X1 3.当N=-3时,求K的值
已知关于X的方程X^2-KX+K^2+N=0有两个不相等的实数根X1 X2 且(2X1+X2)^2-8(2X1+X2)+15=0 1.求证:N小于0 2.试用含K的代数式表示X1 3.当N=-3时,求K的值
已知关于X的方程X^2-KX+K^2+N=0有两个不相等的实数根X1 X2 且(2X1+X2)^2-8(2X1+X2)+15=0 1.求证:N小于0 2.试用含K的代数式表示X1 3.当N=-3时,求K的值
1.方程X^2-KX+K^2+N=0有两个不相等实根 所以(-K)^2-4*(K^2+N)>0 化简可得N
这个题的顺序不对,先给你解(2)问,再解(1)
(2) 设2x1+x2=t,
方程(2X1+X2)^2-8(2X1+X2)+15=0可化为 t^2-8t+15=0
解得 2x1+x2=t=5或3 ①
∵由韦达定理 x1+x2=k ② ∴①-②:x1=5-k或3-k
(1) 由(2):2②-①:...
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这个题的顺序不对,先给你解(2)问,再解(1)
(2) 设2x1+x2=t,
方程(2X1+X2)^2-8(2X1+X2)+15=0可化为 t^2-8t+15=0
解得 2x1+x2=t=5或3 ①
∵由韦达定理 x1+x2=k ② ∴①-②:x1=5-k或3-k
(1) 由(2):2②-①:x2=2k-5或2k-3
取x1=5-k x2=2k-5(都是正的,不影响结果,也可取t=3)
x1*x2=k^2+N=(5-k)(2k-5)③
③方程可化为 -(k-5/2)^2=(4N+25)/12
∴(4N+25)/12≤0 ∴4N<0 ∴N<0
(3)由上 N=-3代入③ k^2-3=(5-k)(2k-5)
解得 k=
(本人有点懒 最后结果 嘿嘿~~)
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证明:(1)∵关于x的方程x2-kx+k2+n=0有两个不相等的实数根,
∴△=k2-4(k2+n)=-3k2-4n>0,
∴n<- 3/4 k2
又-k2≤0,
∴n<0.
(2)∵(2x1+x2)2-8(2x1+x2)+15=0,x1+x2=k,
∴(x1+x1+x2)2-8(x1+x1+x2)+15=0
∴(x1+k)2-8(x1+k...
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证明:(1)∵关于x的方程x2-kx+k2+n=0有两个不相等的实数根,
∴△=k2-4(k2+n)=-3k2-4n>0,
∴n<- 3/4 k2
又-k2≤0,
∴n<0.
(2)∵(2x1+x2)2-8(2x1+x2)+15=0,x1+x2=k,
∴(x1+x1+x2)2-8(x1+x1+x2)+15=0
∴(x1+k)2-8(x1+k)+15=0
∴[(x1+k)-3][(x1+k)-5]=0
∴x1+k=3或x1+k=5,
∴x1=3-k或x1=5-k.
(3)∵n<-3/4k2,n=-3,
∴k2<4,即:-2<k<2.
原方程化为:x2-kx+k2-3=0,
把x1=3-k代入,得到k2-3k+2=0,
解得k1=1,k2=2(不合题意),
把x1=5-k代入,得到3k2-15k+22=0,△=-39<0,所以此时k不存在.
∴k=1.
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