Use the function y = 10x + 9 to make an input-output table.
Write the equations of the lines that form the four sides of the right trapezoid with vertices at (−16, 7), (−16, −4), (5, −4), and (16, 7).
Triangles $BDC$ and $ACD$ are coplanar and isosceles. If we have $m\angle ABC = 70^\circ$, what is $m\angle BAC$, in degrees?
In the diagram, $R$ is on $QS$ and $QR=8$. Also, $PR=12$, $\angle PRQ=120^\circ$, and $\angle RPS = 90^\circ$. What is the area of $\triangle QPS$?
1.) When the polynomial p (x) is divided by (x + 3), The quotient is x^2-1. What is p(x)? And how do you find p(x)?
2.) suppose p(x) Is the product of a polynomial of degree 4 and a cubic polynomial. How many complex zeros does p(x) have? Explain
p (x) has a maximum of 7 zeros
x^4*x^3=x^7
Is the equation of this line
y=1/4x?
check my work?
Did i graph this right?
how do i Graph y=–7/3x+2 ?
Nach zu viel Zeit ohne Hilfe frag ich einfach mal hier ob jemand Helfen kann.
