（2006o西城区二模）双曲线x2a2-y2b2=1（a＞0，b＞0）的离心率为3，A、F分别是双曲线的左顶点、右焦点，过点F的直线l交双曲线的右支于P、Q两点，交y轴于R点，AP、AQ分别交右准线于M、N两点．（1）若RQ=5QF，求直线l的斜率；（2）证明：M、N两点的纵坐标之积为-43a2． - 跟谁学
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在线咨询您好，告诉我您想学什么，15分钟为您匹配优质老师哦马上咨询&&&分类：（2006o西城区二模）双曲线x2a2-y2b2=1（a＞0，b＞0）的离心率为3，A、F分别是双曲线的左顶点、右焦点，过点F的直线l交双曲线的右支于P、Q两点，交y轴于R点，AP、AQ分别交右准线于M、N两点．（1）若RQ=5QF，求直线l的斜率；（2）证明：M、N两点的纵坐标之积为-43a2．（2006o西城区二模）双曲线2a2-y2b2=1（a＞0，b＞0）的离心率为，A、F分别是双曲线的左顶点、右焦点，过点F的直线l交双曲线的右支于P、Q两点，交y轴于R点，AP、AQ分别交右准线于M、N两点．（1）若，求直线l的斜率；（2）证明：M、N两点的纵坐标之积为-2．科目:最佳答案（1）解：设P（x1，y1），Q（x2，y2），∵双曲线的离心率为，∴，∴双曲线方程为2x2-y2=2a2，∵，∴2=56c，∵直线l：y=k（x-c），∴2=-ck6，点Q是双曲线上一点，∴2-(-ck6)2=2a2，整理得，2-136e2k2=2，解得．（2）证明：设P（x1，y1），Q（x2，y2），由已知1x1+a(x+a)，AQ：y=y2x2+a(x+a)，∴M=y1x1+a(a2c+a)，yN=y2x2+a(a2c+a)，∴MyN=y1x1+aoy2x2+a(a2c+a)2=y1y2x1x2+a(x1+x2)+a2(a2c+a)2，由2-y2=2a2，得（2-k2）x2+2k2cx-k2c2-2a2=0∴1+x2=2k2ck2-2，x1x2=k2c2+2a2k2-2，1y2=k2(x1-c)(x2-c)=k2[x1x2-c(x1+x2)+c2]=k22a2-2c2k2-2，1x2+a(x1+x2)+a2=k2(a+c)2k2-2，∴MyN=2(a2-c2)(a+c)2oa2(a+c)2c2=-43a2．解析（1）利用双曲线的离心率、向量关系即可表示出点Q的坐标，再代入双曲线的方程即可得出；（2）分别求出AP，AQ与右准线的交点的纵坐标，再把直线PQ的方程与双曲线的方程联立可得根与系数的关系，即可得出．知识点:&&&&基础试题拔高试题热门知识点最新试题
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N = (x^2 + y^2)/(1+xy) is a Square
If the number (a^2 + b^2)/(1+a*b)
with a,b integers is a positive
integer, then it is a perfect square.
(The stipulation of *positive*
integer is required, because we have integers a=1, b=-2 such that
(a^2 + b^2)/(1+ab) equals the integer -5, but this is not a perfect
To prove this, first note that, for any positive integer
N, if the equation
is an integer, with x > y (clearly x cannot equal y except when x=y=1),
then we have the following polynomial with integer coefficients
x^2 - (Ny)x + (y^2 - N)
The two roots of this equation x1 and x2 satisfy the relation
x1 + x2 = Ny
x1 x2 = y^2 - N
Hence if (x1,y) is a solution, then so is (x2,y) where x2 = Ny - x1.
Also, since x1 exceeds y, we know that y exceeds x2, as is clear from
the right hand expression above.
Repeating this process, we have a strictly decreasing sequence of
integers given by
s[0] = x1,
s[k] = N s[k-1] - s[k-2]
We know that
s[k]^2 + s[k+1]^2
-----------------
1 + s[k]s[k+1]
for k=1,2,3,...
If s[k+1] = 0 for some index k, then N = s[k]^2, so
N is a square.
The key is to show that this sequence MUST pass
through 0.
To prove this, suppose the sequence does not pass through
It follows that, since the sequence is strictly decreasing, it
must contain two consecutive integers with opposite signs.
(x^2 + y^2)/(1+xy)
must be either infinite (if xy=-1) or
negative (if xy &lt -1), contradicting that fact that this quantity
equals N, which is a finite positive integer.
This completes the
Notice that if the quantity N = (x^2 + y^2)/(1+xy) is a negative
integer for integers x,y, then N=-5.
There are exactly two distinct
infinite families of solutions in this case, given by the following
sequences (with alternating signs)
each of which satisfies the recurrence s[k] = 5s[k-1] - s[k-2].
We can generalize the proposition to cover positive integers of the
x^2 + Kxy + y^2
---------------
for all integers N greater than K, where K is a positve integer not
equal to 2.
(We exclude 2 for reasons that will be explained below.)
In this case we have the polynomial
x^2 - (Ny-Ky)x + (y^2 - N)
which shows that if (x1,y) is a solution, then (x2,y) is also a
solution, where x2 = (N-K)y - x1.
Also, if x1 exceeds y, then x2 is
less than y.
If we try to prove that every integer N (greater than
K) given by this equation is a square, we can proceed just as before,
except that now, depending on the value of K, it is possible to have
x,y with opposite signs yielding an integer value of N greater than
We excluded the case K=2 because in that case we can achieve
ANY value of N by setting y=1 and x=N-1.
This is not ruled out by
the "descent" argument because all these cases descend back to the
pair 1,-1, which gives the indeterminate 0/0, and allows for any
value of N.
So, excluding that special case, let X,Y denote the absolute values
of x and y, and observe that if x and y have opposite signs the
expression for N can be written in the form
X^2 + Y^2 - K
N = K - -------------
which shows that x^2 + y^2 must be less than K in order for N to
Thus there are just a finite number of pairs (x,y) with
opposite sign that can yield a value of N greater than K.
are the only possible non-square values of N.
The smallest possible
pair is 1,-2 (which is equivalent to 2,-1), in which case we have
N = (5-2K)/-1, which we require to be greater than K.
This implies
the inequality K > 5.
Hence, any integer value of N (greater than K)
must be a square for K = 0, 1, 3, 4, or 5.
For K=6 the pair 1,-2 gives N=7, so every integer value of N greater
than 6 is either a square or equal to 7.
More generally, every value
of K greater than 5 allows the pair 1,-2, so we always have the N
value of N = 2K-5.
For example, with K=7 the pair 1,-2 gives N=9.
However, in this particular case the "exceptional" N value also
happens to be a square, so we can say that any integer N greater
than 7 is a square.
This occurs for K = 7, 15, and 115, so the
non-negative integers K such that every positive integer N of the
form (x^2 + Kxy + y^2)/(1+xy) greater than K is a square is
0, 1, 3, 4, 5, 7, 15, 115
The number of minimal pairs x,y with opposite sign yielding integer
values of N tends to increase as K increases, but it appears that
there are infinitely many K for which the only reduced pair is 1,-2.
The first such K values are
6, 7, 8, 9, 10, 13, 15, 19, 21, 25, 31, 37, 39, 45, 49,
61, 81, 85, 99, 109, 115, 129, 141, 145, 151, 159, 169,
175, 229, 285, 295, 319, 325, 361, 375, 445, 501, ...
(This list includes the squares of 3, 5, 7, 9, 13, 19, and 63.)
numbers are the result of a progressive sieve, analogous to the prime
For example, every term greater than 10 must not be divisible
by 2, because otherwise it would give an integer N for (3K-10)/2 based
on the pair 1,-3.
Likewise from the pair 2,-2 we see that every term
greater than 8 must not be congruent to 2 modulo 3, because otherwise
it would give an integer N for (4K-8)/3.
Here is a short table of
the expressions that must not be integers for sufficiently large
"prime K" values
( 4K-17)/ 3
( 5K-26)/ 4
( 8K-20)/ 7
(10K-29)/ 9
(12K-25)/11
(15K-34)/14
(16K-32)/15
(20K-41)/19
(25K-50)/24
In each case the expression (AK-B)/(A-1) implies that for K values
greater than B we must exclude those such that K = B (mod A-1).
other words, the sieve excludes every number greater than q = x^2 + y^2
congruent to q mod (xy-1).如图抛物线y＝ax＾2－5x＋4a与x轴相交于点A、B且过点C（5、4）_百度知道
如图抛物线y＝ax＾2－5x＋4a与x轴相交于点A、B且过点C（5、4）
图抛物线y＝ax＾2－5x＋4a与x轴相交于点A、4）（1）求a的值和该抛物线顶点P的坐标（2）请你设计一种平移的方法，使平移后抛物线的顶点落在第二象限、B且过点C（5
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提问者采纳
得y=(x+3)^2-5(x+3)+7嘿嘿 ;4,-9&#47,得到a=1：（1）代入C(5;2,4)，再向左平移3个单位;2)^2-9&#47,即4=a5^2-5*5+4a,
所以y=x^2-5x+4=(x-5&#47解，所以顶点P（5/4)
（2）向上平移3个单位
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1:把C点带进抛物线计算的a=14/29抛物线与x轴有两个交点且y=0带入计算的出b点的值
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(5-a)/(2-7)=3
(5-(-1))/(2-b)=3 解出b=0
还可以检验一下AB
答案a=20 ...
f(x)=e^x(x&sup2;+ax+a+1)
f&#039;(x)=e^x(x&sup2;+ax+a+1)+e^x(2x+a)
=e^x(x&sup2;+ax+2...
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