We are given this:
First step is to get rid of brackets. There is no sign in front of first brackets, so we do not change the sign. In front of second brackets there is negative sign so we need to change sign for each term inside of those brackets.
Next step is to group terms with same exponent in descending order.
Now we add or substract terms with same exponent.
Standard form means ordering terms in a descending order of an exponent.
419.10>419.099 419.10 is greater than 419.009
Answer:
d. the fourth graph
Step-by-step explanation:
this is correct on edge 2020
Remark
There are two things you need to realize
1. You are traveling around the quadrants in a clockwise direction.
2. You will wind up with a minus angle between 0 and - 360 which will be different than if you were traveling counterclockwise.
Method
step one
divide - 798 by 360
-798 / 360 = - 2.21666667
Step Two
Drop the integer (in this case minus two). You get
-0.2166666667
Note the minus 2 indicates that you have traveled around the circle twice (that explains the 2) in the clockwise direction (that explains the minus). Minus means clock wise.
Step Three
Multiply the fraction amount by 360 to get the actual angle
-0.2166666667 * 360 = - 78 degrees.
Step Four
Discuss the answer.
You should realize two things.
1. You are in the fourth quadrant with - 78 degrees.
2. If you want the positive equivalent, add 360 to your answer.
- 78 + 360 = 282
Answer
- 78 degrees
262 degrees.
Comment
If you know what the sine Cosine and Tangent is, you can check that these are the same thing with your calculator
x = - 798 - 78 282
Sin(x) -0.9781 -0.9781 -0.9781
Cos(x)
Tan(x)
If you do not know how to enter this into your calculator make sure you are in degrees and follow this procedure.
sin(
-
798
=
Answer
1. You are in the 4th quadrant.
2, The positive angle is 282 which is between 0 and 360
I'm going to assume that you meant the equation to be:
So we're going to take that equation and we're going to solve for h(-2).
This means that we plug in a '-2' for every x in the equation:
So when we solve the equation for h(-2), we get 0 as our answer.