Answer:
(-4, 0) and (-3, 2)
Step-by-step explanation:
Substitute each value into the equation.
Since x = -4 in the first ordered pair, to find y, you just put it into the equation as x:
y = 2(-4) + 8
y = -8 + 8
y = 0
The first ordered pair is (-4, 0)
Now, do the same for the second ordered pair. Substitute 2 for the y and solve for x:
2 = 2x + 8
-6 = 2x
x = -3
The second ordered pair is (-3, 2)
I hope this helps!
Answer:
<em>The answer is the option A.</em>
Step-by-step explanation:
The Given Expression is
60 and 1/3
20 and 1/3
= (2*2*3*5) 1/3
( 2*2*5) 1/3
<em>= Cancelling 2*2*3 from numerator and denominator</em>
<em>= 3 and 1/3</em>
<em>Factor of 60 and 20 are</em>
<em>60=2*2*3*5</em>
<em>20=2*2*5</em>
Option A
Answer:
Step-by-step explanation:
Answer:
Angle bisector
Step-by-step explanation:
median isn't applicable in this case as the roads from the streets are inclined at an angle.
altitude refers to height which is also not applicable
The perpendicular bisector is the locust of points equidistant from two points,
in this question the street are not seen as points but as lines which forms an angle and the bisection of this angle forms a locus where she can park her car. If she parks her car anywhere on the angular bisector of the two streets, she would be at equal distance from both streets.
Answer:
In this case, if you sum the first seven terms of your sum, you get 0.0002, that means that your error is less than 0.00002 , in other words, if you sum 6 terms of your sum, 4 terms of your result are correct, (because the error is less than 0.00002).
Step-by-step explanation:
Remember what the alternating series theorem says, basically it states that for a convergent alternating series .
The error of the series can be estimated as follows
The meaning of the theorem is that is an upper bound of the n-error of your sum.
In this case, if you sum the first seven terms of your sum, you get 0.0002, that means that your error is less than 0.00002 , in other words, if you sum 6 terms of your sum, 4 terms of your result are correct, (because the error is less than 0.00002).