IDNLearn.com: Your go-to resource for finding expert answers. Our platform offers reliable and detailed answers, ensuring you have the information you need.
Sagot :
First question
[tex]line:~~~~y=x+3[/tex]
[tex]curve:~~~~x^2+y^2=29[/tex]
now we have to replace the y of curve by the y of line, therefore
[tex]x^2+(x+3)^2=29[/tex]
[tex]x^2+x^2+6x+9=29[/tex]
[tex]2x^2+6x+9-29=0[/tex]
[tex]2x^2+6x-20=0[/tex]
we can multiply each member by [tex]\frac{1}{2}[/tex]
[tex]\boxed{\boxed{x^2+3x-10=0}}[/tex]
Now we have to find the roots of this funtion
[tex]x^2+3x-10=0[/tex]
Sum and produc or Bhaskara
Then we find two axis
[tex]\boxed{x_1=2~~and~~x_2=-5}[/tex]
now we replace this values to find the Y, we can replace in curve or line equation, I'll prefer to replace it in line equation.
[tex]y=x+3[/tex]
[tex]y_1=x_1+3[/tex]
[tex]y_1=2+3[/tex]
[tex]\boxed{y_1=5}[/tex]
[tex]y_2=x_2+3[/tex]
[tex]y_2=-5+3[/tex]
[tex]\boxed{y_2=-2}[/tex]
Therefore
[tex]\boxed{\boxed{P_1(2,5)~~and~~P_2(-5,-2)}}[/tex]
_______________________________________________________________
The second question give to us
[tex]y=ax+b[/tex]
[tex]P_1(2,13)[/tex]
[tex]P_2(-1,-11)[/tex]
We just have to replace the value then we'll get a linear system.
point 1
[tex]13=2a+b[/tex]
point 2
[tex]-11=-a+b[/tex]
then our linear system will be
[tex]\begin{Bmatrix}2a+b&=&13\\-a+b&=&-11\end{matrix}[/tex]
I'll multiply the second line by -1 and I'll add to first one
[tex]\begin{Bmatrix}2a+(a)+b+(-b)&=&13+(-11)\\-a+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}3a&=&24\\-a+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}a&=&8\\-a+b&=&-11\end{matrix}[/tex]
therefore we can replace the value of a, at second line
[tex]\begin{Bmatrix}a&=&8\\-8+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}a&=&8\\b&=&-11+8\end{matrix}[/tex]
[tex]\boxed{\boxed{\begin{Bmatrix}a&=&8\\b&=&-3\end{matrix}}}[/tex]
then our function will be
[tex]\boxed{\boxed{y=8x-3}}[/tex]
_________________________________________________________________
The third one, we have
[tex]line:~~~~y=3x-4[/tex]
[tex]curve:~~~~y=x^2-2x-4[/tex]
This resolution will be the same of our first question.
Let's replace the y of curve by the y of line
[tex]3x-4=x^2-2x-4[/tex]
[tex]0=x^2-2x-4-3x+4[/tex]
therefore
[tex]\boxed{\boxed{x^2-5x=0}}[/tex]
now we have to find the roots of this function.
[tex]x^2-5x=0[/tex]
put x in evidence
[tex]x*(x-5)=0[/tex]
[tex]\boxed{x_1=0~~and~~x_2=5}[/tex]
then
[tex]y=3x-4[/tex]
[tex]y_1=3x_1-4[/tex]
[tex]y_1=3*0-4[/tex]
[tex]\boxed{y_1=-4}[/tex]
[tex]y_2=3x_2-4[/tex]
[tex]y_2=3*5-4[/tex]
[tex]y_2=15-4[/tex]
[tex]\boxed{y_2=11}[/tex]
our points will be
[tex]\boxed{\boxed{P_1(0,-4)~~and~~P_2(5,11)}}[/tex]
I hope you enjoy it ;)
[tex]line:~~~~y=x+3[/tex]
[tex]curve:~~~~x^2+y^2=29[/tex]
now we have to replace the y of curve by the y of line, therefore
[tex]x^2+(x+3)^2=29[/tex]
[tex]x^2+x^2+6x+9=29[/tex]
[tex]2x^2+6x+9-29=0[/tex]
[tex]2x^2+6x-20=0[/tex]
we can multiply each member by [tex]\frac{1}{2}[/tex]
[tex]\boxed{\boxed{x^2+3x-10=0}}[/tex]
Now we have to find the roots of this funtion
[tex]x^2+3x-10=0[/tex]
Sum and produc or Bhaskara
Then we find two axis
[tex]\boxed{x_1=2~~and~~x_2=-5}[/tex]
now we replace this values to find the Y, we can replace in curve or line equation, I'll prefer to replace it in line equation.
[tex]y=x+3[/tex]
[tex]y_1=x_1+3[/tex]
[tex]y_1=2+3[/tex]
[tex]\boxed{y_1=5}[/tex]
[tex]y_2=x_2+3[/tex]
[tex]y_2=-5+3[/tex]
[tex]\boxed{y_2=-2}[/tex]
Therefore
[tex]\boxed{\boxed{P_1(2,5)~~and~~P_2(-5,-2)}}[/tex]
_______________________________________________________________
The second question give to us
[tex]y=ax+b[/tex]
[tex]P_1(2,13)[/tex]
[tex]P_2(-1,-11)[/tex]
We just have to replace the value then we'll get a linear system.
point 1
[tex]13=2a+b[/tex]
point 2
[tex]-11=-a+b[/tex]
then our linear system will be
[tex]\begin{Bmatrix}2a+b&=&13\\-a+b&=&-11\end{matrix}[/tex]
I'll multiply the second line by -1 and I'll add to first one
[tex]\begin{Bmatrix}2a+(a)+b+(-b)&=&13+(-11)\\-a+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}3a&=&24\\-a+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}a&=&8\\-a+b&=&-11\end{matrix}[/tex]
therefore we can replace the value of a, at second line
[tex]\begin{Bmatrix}a&=&8\\-8+b&=&-11\end{matrix}[/tex]
[tex]\begin{Bmatrix}a&=&8\\b&=&-11+8\end{matrix}[/tex]
[tex]\boxed{\boxed{\begin{Bmatrix}a&=&8\\b&=&-3\end{matrix}}}[/tex]
then our function will be
[tex]\boxed{\boxed{y=8x-3}}[/tex]
_________________________________________________________________
The third one, we have
[tex]line:~~~~y=3x-4[/tex]
[tex]curve:~~~~y=x^2-2x-4[/tex]
This resolution will be the same of our first question.
Let's replace the y of curve by the y of line
[tex]3x-4=x^2-2x-4[/tex]
[tex]0=x^2-2x-4-3x+4[/tex]
therefore
[tex]\boxed{\boxed{x^2-5x=0}}[/tex]
now we have to find the roots of this function.
[tex]x^2-5x=0[/tex]
put x in evidence
[tex]x*(x-5)=0[/tex]
[tex]\boxed{x_1=0~~and~~x_2=5}[/tex]
then
[tex]y=3x-4[/tex]
[tex]y_1=3x_1-4[/tex]
[tex]y_1=3*0-4[/tex]
[tex]\boxed{y_1=-4}[/tex]
[tex]y_2=3x_2-4[/tex]
[tex]y_2=3*5-4[/tex]
[tex]y_2=15-4[/tex]
[tex]\boxed{y_2=11}[/tex]
our points will be
[tex]\boxed{\boxed{P_1(0,-4)~~and~~P_2(5,11)}}[/tex]
I hope you enjoy it ;)
We appreciate your presence here. Keep sharing knowledge and helping others find the answers they need. This community is the perfect place to learn together. For trustworthy and accurate answers, visit IDNLearn.com. Thanks for stopping by, and see you next time for more solutions.