now, the denominator has a higher degree, a degree of 1, than the numerator's, therefore the horizontal asymptote for this function is at y = 0.
now, the vertical asymptotes of it, are at the zeros of the denominator, namely x = 0, when is x = 0? at 0, so the vertical asymptote for this function is at x = 0, the y-axis.
now, if we want the horizontal asymptote moved over from its position at 0, over to x = 5, simply translate it by 5 units,
.
and if we want the vertical asymptote to move down from 0 to -3, simply translate the function vertically 3 units,
<span><span>First, write down the decimal number the numerator and 1 as the denominator.
</span><span>
Next, multiply both the numerator and the denominator by 10 for every number after the decimal point. (E.g.: If there are two numbers after the decimal point, use 100, if there are three, use 1000, etc.)
</span><span>
Finally, simplify the fraction to get it in it's simplest form.</span></span>
Answer:
Step 1
V=\piπ(r^{2}r
2
)\cdot⋅h
Volume of a cyclinder
Step 2
2 of 4
V=\piπ((6.5\cdot10^{-3}cm)^{2}(6.5⋅10
−3
cm)
2
)\cdot⋅1.1cm
Plug in values
Step 3
3 of 4
1.46006\cdot10^{-4} cm^{3}
1.46006⋅10
−4
cm
3
After simplify the equation from step 2 and using significant figures.
Result
4 of 4
1.5\cdot10^{-4} cm^{3}
1.5⋅10 −4
cm 3
Step-by-step explanation:
So i looked this up... I hope this helps!
Step-by-step explanation:
Before we proceed, we must understand that we are dealing with a system of right angled triangles.
There are two types of right angle triangles';
45° - 45° - 90° 30° - 60° - 90°
In 45° - 45° - 90°, the adjacent is equal to the opposite
30° - 60° - 90°, there are three different sides
The longest side faces 90°, the shortest side will face the smallest angle and the intermediate will face 60°
A.
To find AB, use Pythagoras theorem;
AB² = AC² + BC²
AB² = 13² + 4²
AB² = 169 + 16 = 185
AB = √185 = 13.6
AB = 13.6
Angle A = 30°
Angle B = 60°
B.
AB² = BC² + AC²
The unknown is AC;
AC² = AB² - BC²
AC² = 5² - 4²
AC² = 9
AC = √9 = 3
Angle A = 60°
Angle B = 30°
C.
AB² = AC² + BC²
Insert the parameters and find AC;
AC² = AB² - BC²
AC² = 11² - 4.4²
AC² = 101.64
AC = √101.64
AC = 10.1
Angle A = 30°
Angle B = 60°
AC = 13