Answer:
A:100°
Step-by-step explanation:
BECAUSE IS THE SAME
this question is incomplete
To write each combination of vectors as a single vector, we can simply add them together. For example, to write the combination of vectors AB + BC as a single vector, we would simply add the vectors AB and BC together.
Here is how to write each combination of vectors as a single vector:
AB + BC = AC
CD + DB = CB
DB - AB = BD
DC + CA + AB = AD
Here is a diagram to help visualize the addition of vectors:
[Diagram of vector addition]
In the diagram, vectors AB and BC are added together to create vector AC. Vector AC is the sum of vectors AB and BC.
We can also use the following formula to write the combination of vectors as a single vector:
A + B = (A_x + B_x, A_y + B_y)
where A_x and A_y are the components of vector A, and B_x and B_y are the components of vector B.
For example, to write the combination of vectors AB + BC as a single vector, we would use the following formula:
AB + BC = (AB_x + BC_x, AB_y + BC_y)
where AB_x and AB_y are the components of vector AB, and BC_x and BC_y are the components of vector BC.
To know more about vectors
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Write z in exponential form:
Then taking the logarithm, we get
so a is the correct answer.
Answer:
0.20m + 650 < 755
Step-by-step explanation:
So you know that m is the total amount of miles that he travelled, so the cost of these miles would have been 0.20m. The total also included 650 and it has to be less than 755. Thus the equation would be 0.20m + 650 < 755 which means that the sum of 0.20m (cost of miles) and 650 (night cost) is less than (< means less than something else on the right) 755.
Answer:
5676039
Step-by-step explanation:
-14² + 5675843
Solve for exponent.
196 + 56758
Add the numbers.
= 5676039
Select one:
a. y = 5/3x + 20 2/3
b. y=-5/3x – 12 2/3
c.y= 3/5x + 10
d. y = -3/5x-2
Answer:
C
Step-by-step explanation:
We want to write the equation of a line that is parallel to:
And also passes through (-10, 4).
Remember that parallel lines have the same slope.
The slope of our old line is 3/5.
Therefore, the slope of our new line is also 3/5.
We know that it passes through (-10, 4). So, we can use the point-slope form:
Where m is the slope and (x₁, y₁) is a point.
So, let's substitute 3/5 for m and let (-10, 4) be our (x₁, y₁). This yields:
Simplify:
Distribute on the right:
Add 4 to both sides:
So, our answer is C.
And we're done!
Step-by-step explanation:
Hey there!
The equation of a st.line passing through point (-10,4) is ;
(y-y1)= m1(x-x1) [one point formula]
Put all values.
(y - 4) = m1( x + 10)..........(i)
Another equation is; y = 3/5 + 8.............(ii)
From equation (ii)
Slope (m2) = 3/5 [ By comparing equation with y = mx+c].
As per the condition of parallel lines,
Slope of equation (i) = slope of equation (ii)
(i.e m1 = m2 )
Therefore, the value of m1 is 3/5.
Putting value of slope in equation (i).
Therefore the required equation is y = 3/5x + 10.
Hopeit helps...