Intersection problems Find the following ...

Question

Intersection problems Find the following points of intersection.

The point(s) of intersection of the parabolas y= x² and y= -x² + 8x

Accepted Answer

Hi, everyone. Let's take a look at this practice problem dealing with finding points of intersection. This problem says to determine the points of intersection for the Parabola, Y is equal to three multiplied by X squared. And the Parabola Y is equal to minus two, X squared plus 12, X minus +74 possible choices as our answers. Choice A, we have the points one comma three and the 0.7 divided by five, comma 27 divided by five. For choice B, we have the point of one comma three and the point seven divided by five comma 147 divided by 25. For choice C, we have the point of minus one comma three and the point of seven divided by five, comma 27 divided by five. And for choice D, we have the 0.1 comma minus three and the 0.7 divided by five, comma 147 divided by 25. Now, in order to find the points of intersection between two functions, we need to just set those two functions equal to each other. So here in both cases, we have Y is equal to something. So we're gonna set both right hand sides of these equations equal to each other. And so we're gonna have three X squared equal to minus two X squared plus 12 X minus seven. So now what I need to do is move everything onto the left hand side of the equation in order to get a, an equation that is in the quadratic form. So to do that, we're going to add two X squared to both sides of the equation. So we'll get on the left hand side five X squared. So we'll add the two X squared to the three X squared to give me five X squared. We're going to subtract the 12 X squared. When I move it to the other side, we'll have then minus 12 X, then we'll add seven to both sides of the equations to move the minus seven on the right hand side over to the left hand side. And so the one they will also have plus seven, that's all gonna be equal to zero. So now I have my equation in the quadratic form, we can actually solve this for X and we can actually factor this quadratic equation. And so we're gonna have two factors. The first factor is gonna be the quantity of five X minus seven in quantity. And the other factor is going to be the quantity of X minus one in quantity. And this is gonna, that product is gonna be equal to zero. So now we can um solve the equation for X and we're gonna get two solutions. So we set each factor equal to zero. So we'll have five, X minus seven is equal to zero. And we can solve this for X by adding isolating X by adding seven to the both sides the equation and dividing both sides by five. And so that means X is going to be equal to seven divided by five. For the other factor we're gonna have X minus one equal to zero. And we could solve this for X by adding one to both sides of the equation. And so we'll get X is equal to one. So then we need to do is find the Y values now that we have the X values, we can use either equation for the paras that we're given in the problem. The simplest one to use is gonna be the first one we have Y is equal to three X squared. So plugging in for um X equal to seven divided by five, we're gonna get Y is equal to three, multiplied by the quantity of seven divided by five in quantity squared. And so that means our Y value is going to be equal to, and we can evaluate the expression on the right. That turns out to be 147 divided by 25. So that's gonna be our Y value for when X is equal to seven divided by five. We'll do the same thing for when we have X equal to one. So we'll substitute that value in, for X into our equation. We'll have Y is equal to three, multiplied by one squared. And so that means that Y is going to be equal to three in that case. So for our two points here, we're gonna have, the first point is gonna be seven divided by five comma 147 divided by 25. And the second point is going to be one comma three. So those are the two points of intersection, four are two Parabolas. And if I look at my answer choices, the correct answer choice corresponds to answer choice B so I hope this explanation has been helpful and I'll see you in the next video.

Intersection problems Find the following points of intersection.

The point(s) of intersection of the parabolas y= x² and y= -x² + 8x

Key Concepts

Finding Points of Intersection

Quadratic Functions

Solving Quadratic Equations

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