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Question 1071488: Find the range of k in the of equations below if this system has 2 real solutions. Show your work. y=(x-1)^2+3 & y=2x+k
Answer by KMST(5328)   (Show Source):
You can put this solution on YOUR website!  -->  -->  -->  --> 
If we chose a real  so that  has 2 real solutions for  ,
we will have the corresponding real solutions for  .
For a quadratic equation  to have 2 real solutions
(which could both be the same)
it must be  .
For the two real solutions to be different we need  .
So, in the case of ,
where  ,  and  ,
to have 2 real solutions (which could both be the same) we must have
 -->  -->  -->  -->  .
As an interval it would be    .
If we wanted to have two different real solutions,
we would need to have  ,
and in interval notation that would be  .
IF YOU WERE STUDYING CALCULUS,
the answer would be obvious, if somewhat hard to explain the reasoning.
You would know that the slope of the tangent to 
is  ,
and since the slope of is  ,
the slope of both functions would be the same when
 <-->  <-->  .
That point could be the point of tangency if
both functions have the same  value for .
That would happen for a real such that at <-->
 , meaning that
 <--->  .
That point of tangency would be (2,4), with  .
For <--> ,
the function has  at .
For both functions would have the at 
If  function  will have  , and will be passing through a point inside the parabola, crossing it twice:
If  function  will have  , and will be below the point (2,4) where the slope of is ,
and since the slope of increase with increasing x,
the function , with its constant  will never be able to catch up.
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