Step 1
<u>Find the equation of the line AB</u>
we know that
the equation of the line into point-slope form is equal to
Let
<u>Find the slope m</u>
we know that
the slope between two points is equal to
substitute
with the slope m and point A find the equation of the line AB
or
with the slope m and point B find the equation of the line AB
we will proceed to verify each case to determine the solution of the problem
Step 2
<u>Verify case A</u>
<u>Case A)</u>
the slope of the line is
but the point -----> not lie on the line AB (see the graph)
therefore
the case A is not the solution
Step 3
<u>Verify case B</u>
<u>Case B)</u>
the slope of the line is
and the point -----> is the point A
therefore
the case B is a solution
Step 4
<u>Verify case C</u>
<u>Case C)</u>
the slope of the line is
but the point -----> not lie on the line AB (see the graph)
therefore
the case C is not the solution
Step 5
<u>Verify case D</u>
<u>Case D)</u>
the slope of the line is -----> the slope is not equal to the slope AB
and the point -----> not lie on the line AB (see the graph)
therefore
the case D is not the solution
<u>the answer is</u>
The equation is a point-slope form of the line AB
Sometimes the outlier, if it's too large, can throw off the mean, making it larger and smaller, so it isn't as accurate
sorry if this doesnt make sense if you need me to explain it more I will
Answer:
example of Analog computer=
Operational amplifiers
<span> the answer is 0.66666666666 </span>
Answer:
(a) the price per units is $5.0
(b)the number of units demanded = 7
Step-by-step explanation:
The demand function is given by
(a) Now, we have to find the value of p when q = 6
Substitute q = 6 in the above equation
On simplifying, we get
Rounding to nearest cents, we have
Therefore, the price per units is $5.0
(b)
Now, we have to find q for p = $2.99
Divide both sides by 100
Take natural log both sides
On simplifying, we get
Therefore, the number of units demanded = 7