Answer:
The rate of change in the function Y = 2X +5 is <u>greater than</u> the rate of change of the function represented in the table
Step-by-step explanation:
The given function is
For a linear function in the form y=mx +c, the rate of change is <em>m</em>.
The rate of change of this function is 2
We now determine the rate of change of the function represented in the table.
This is given by
Using the corresponding values from the table, the rate of change is
Therefore the rate of change in the function Y = 2X +5 is greater than the rate of change of the function represented in the table
Answer:
0.3. and 2
Step-by-step explanation:
For this equation: a=1, b=0.3333333333333333, c=0.8333333333333334
1x2+0.333333x+0.833333=0
Step 1: Use quadratic formula with a=1, b=0.3333333333333333, c=0.8333333333333334.
x=
−b±√b2−4ac
2a
x=
−(0.333333)±√(0.333333)2−4(1)(0.833333)
2(1)
x=
−0.3333333333333333±√−3.222222
2
i think this is right :)
The correct question is
<span>The midpoint of kl is m(–8, 1). one endpoint is k(–6, 5). find the coordinates of the other endpoint l.
we know that
the formula of midpoint is
Xm=(x1+x2)/2----> 2*Xm=x1+x2------> x2=2*Xm-x1
Ym=(y1+y2)/2----> </span>2*Ym=y1+y2------> y2=2*Ym-y1<span>
let
(x1,y1)-------> </span>(–6, 5).
(Xm,Ym)-----> (-8,1)
find (x2,y2)
x2=2*Xm-x1-----> 2*(-8)-(-6)----> -10
y2=2*Ym-y1----> 2*(1)-5-----> -3
the point l is (-10,-3)