Respuesta :
The linear function that the any variables have the highest degree of 1
A linear function have two, three five.. infinity number of variables.
for eg :
[tex]\begin{gathered} 1.4x+7u=7x+3y\text{ is a linear function beacuse the degr}ee\text{ of each variable is 1} \\ 2.7x^2+8y+6c-u=0\text{ is not a linear function beacuse the degr}e\text{ of the variable x is 2} \\ \text{ which is greater than 1} \end{gathered}[/tex]The expression for the linear function is :
[tex](y-y_1)=\frac{y_2-y_1}{x_2-x_1}(x-x_1)[/tex]Here we have y = f(x)
5) f(-2)= -3 & f(0)=5
Here, we have x =-2, and y=-3
x=0 and y =5
So, the equation
[tex]\begin{gathered} (y-(-3)_{})=\frac{5_{}-(-3)}{0-(-2)_{}}(x-(-2)_{}) \\ y+3=\frac{5+3}{2}(x+2) \\ y+3=\frac{8}{2}(x+2) \\ y+3=4(x+2) \\ y+3=4x+8 \\ y=4x+8-3 \\ y=4x+5 \end{gathered}[/tex]Answer : Required equation : y = 4x+5
6) f(-2)=4 & f(-5)=7
Here we have at x =-2 and f(-2)=4 i.e y = 4
and at x = -5 and f(-5) =7i.e y =7
So, the equation is :
[tex]\begin{gathered} (y-4_{})=\frac{7_{}-4}{-5_{}-(-2)}(x-(-2)) \\ y-4=\frac{3}{-3}(x+2) \\ y-4=(-1)(x+2) \\ y-4=-x-2 \\ x+y=4-2 \\ x+y=2 \end{gathered}[/tex]Answer : Required Equation : x + y =2
