Evaluate the six trigonometric functions of 210 degrees
1. Evaluate the six trigonometric functions of 210 degrees
Answer:
sin210. -1/2
cos210. -√3/2
tan210. √3/3
cot210. √3
sec210. -2√3/3
csc210. -2
radian name. 7π/6.
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2. evaluate the six trigonometric function of the given angel of the triangle
Answer:
sinb = 15/17
cosb= 8/17
tanb= 15/8
cscb=17/15
secb= 17/8
cotb= 8/15
Step-by-step explanation:
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3. Use the value of the trigonometric function to evaluate the indicated functions. cos (-t) = -(1/5) i. sec(-t)
By definition, the secant is the reciprocal of the cosine, that is:
[tex]sec x = \frac{1}{cos x}[/tex].
Since cos(-t) = -(1/5), we can use this reciprocal property to get:
[tex]sec(-t) = \frac{1}{cos(-t)}[/tex]
Substituting that,
[tex]sec(-t) = \frac{1}{-\frac{1}{5}}[/tex]
Thus, we get
sec(-t) = -5.
Just to caution though, of course, if cos(x) = 0, the secant is undefined.
Here's some more information on trigonometric values:
https://brainly.ph/question/1922934https://brainly.ph/question/285258https://brainly.ph/question/1483764Hope this helps!
4. What mathematical concepts and skills are needed in evaluating the limits of exponential, logarithmic and trigonometric functions?
Answer:
Exponential functions are continuous over the set of real numbers with no jump or hole discontinuities. To evaluate the limit of an exponential function, plug in the value of c. Find the limit of the exponential function below. To find the limit, simplify the expression by plugging in 1: 3^{ 2 ( 1 ) - 1 } = 3.
Step-by-step explanation:
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5. Difference between trigonometric functions and inverse trigonometric functions
Step-by-step explanation:
The inverse trigonometric functions perform the opposite operation of trigonometric functions such as sine, cosine, tangent, cosecant, secant and contangent. We know that trigonometric functions are especially applicable to the right angle triangle
Answer:
Trigonometric functions are the functions of an angle The inverse trigonometric functions are inverse,
6. what are the trigonometric functions?
Answer:a function of an angle, or of an abstract quantity, used in trigonometry, including the sine, cosine, tangent, cotangent, secant, and cosecant, and their hyperbolic counterparts.
Answer:
a function of an angle, or of an abstract quantity, used in trigonometry, including the sine, cosine, tangent, cotangent, secant, and cosecant, and their hyperbolic counterparts.
7. define trigonometric functions
Answer:
Trigonometric functions are also known as a Circular Functions can be simply defined as the functions of an angle of a triangle. It means that the relationship between the angles and sides of a triangle are given by these trig functions. The basic trigonometric functions are sine, cosine, tangent, cotangent, secant and cosecant
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8. Antiderivatives of inverse trigonometric functions
Answer:
In this section we focus on integrals that result in inverse trigonometric functions. We have worked with these functions before. Recall, that trigonometric functions are not one-to-one unless the domains are restricted. When working with inverses of trigonometric functions, we always need to be careful to take these restrictions into account. Also, we previously developed formulas for derivatives of inverse trigonometric functions. The formulas developed there give rise directly to integration formulas involving inverse trigonometric functions.
9. Graphing trigonometric functions
this is the most important and exciting part of mathematics for me, coz trig function will teach us how to plot a wave. its rpm or cycle,period, the upper and lower height which is the amplitude, will determine how high is the wave..as i said the most exciting on it, is its application in our daily situation...almost everything around has a close relationship of trig function.,,if you wish to ask me, what are some of those, then i'll tell you few..^-^
10. trigonometric functions
Answer:
B
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11. A Give the six trigonometric functions
Answer:
There are six functions of an angle commonly used in trigonometry. Their names and abbreviations are
sine (sin),
cosine (cos),
tangent (tan),
cotangent (cot),
secant (sec), and
cosecant (csc).
Answer:
sine (sin), cosine (cos), tangent (tan), cotangent (cot), secant (sec), and cosecant (csc).
Step-by-step explanation:There are six functions of an angle commonly used in trigonometry. Their names and abbreviations are sine (sin), cosine (cos), tangent (tan), cotangent (cot), secant (sec), and cosecant (csc).12. Identify the trigonometric functions
[tex]\large \bold {SOLUTION}[/tex]
6. Hypothenuse over Adjacent = Secant
7. Hypothenuse over Opposite = Cosecant
8. Adjacent over Opposite = Cotangent
9. Adjacent over Hypothenuse = Cosine
10. Opposite over Hypothenuse = Sine
❤
13. trigonometric functions
Answer:
Sin 0 = 6/9
cos 0 = 7/9
tan 0 = 6/7
csc 0 = 9/8
sec 0 = 9/7
cot 0 = 7/6
14. Six trigonometric functions
Answer:
There are six trigonometric ratios; sine, cosine, tangent, cosecant, secant and cotangent. These six trigonometric ratios are abbreviated as sin, cos, tan, csc, sec, cot.
Step-by-step explanation:
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15. Use the value of the trigonometric function to evaluate the indicated functions. sin t = 1/3 i. csc(-t) ? #ama oed
since cosecant is an odd function
we can write csc(-t) as -csc(t)
from
sin(t)=1/3
(1/sin(t))=3 (reciprocal of both sides)
but 1/sin(t) = csc(t) (reciprocal identities)
csc(t)=3
therefore,
-csc(t)=-3 <---answer
16. Guys help Please Thankyou Evaluate the following Inverse Trigonometric Function. a. −1(−1) b. −1(−1)
Answer:
Calculate the value of inverse trigonometricfunction:[tex]\huge\pink{\frac{π}{2}}[/tex]
answer:[tex]\huge\pink{\frac{π}{2}}[/tex]
17. identify the trigonometric ratio of the given trigonometric functions below using the right triangle
Answer:
1. cos A = 12/13
2. tan A = 5/12
3. cot A = 12/5
4. sec A = 13/12
5. csc A = 13/5
6. sin B = 12/13
7. cos B = 5/13
8. tan B = 12/5
9. cot B = 5/12
10. sec B = 13/5
11. csc B = 13/12
12. cos a = 4/5
13. tan a = 3/4
14. cot a = 4/3
15. sec a = 5/4
16. csc a = 5/3
17. sin B = 4/5
18. cos B = 3/5
19. tan B = 4/3
20. cot B = 3/4
21. sec B = 5/3
22. csc B = 5/4
Step-by-step explanation:
sin = opposite/hypotenuse
cos = adjacent / hypotenuse
tan = opposite / adjacent
cot = adjacent / opposite
sec = hypotenuse / adjacent
csc = hypotenuse / opposite
18. The difference of the primary trigonometric function from the that of the secondary function?
Answer:
The primary triginometric ratios are the SINE, COSINE, TANGENT RATIOS while secondary trigonometric ratios are simply the RECIPROCAL of the PRIMARY RATIOS.
19. What mathematical concepts and skills are needed in evaluating limits of exponential, logarithmic and trigonometric functions?
Answer:
Limit of Exponential Functions.As you've seen, there are three essential quantities in a logarithmic equation y = logb x: the base b, the exponent y, and the input x.
20. use the properties of inverse trigonometric functions to evaluate the expression 1. sin{arcsin(-0.2)} 2.arccos (cos 7pie over 2)
Answer:
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Answer:
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Step-by-step explanation:
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21. If tan G = 4/3 and sin G is negative, evaluate the five other trigonometric functions applying the rules in quadrantal functions.
Answer:
Initially, it is imperative that we apprehend the concept of quadrantal angles. Quadrantal angles are a distinct set of angles situated on either the x-axis or y-axis within a coordinate plane and at precise degrees such as 0 degrees, 90 degrees,180 degrees and lastly but not least important -270.degrees.
Since sin G is negative and tan G is positive, we know that angle G lies in the third quadrant of the unit circle, where both sine and tangent are negative.
To find the values of the other trigonometric functions, we can use the Pythagorean identity:sin^2 G + cos^2
G = 1 and the definitions of the other trigonometric functions.
It is within our knowledge that tan G has been established to equal 4/3. Therefore, we can determine the dimensions of y and x as being 4 and 3 respectively - this information follows accordingly from previous statements on tangent relationships in triangle geometry. To obtain a more comprehensive understanding of its components, utilizing Pythagorean theorem will reveal the hypotenuse measurements (r).
r^2 = x^2 + y^2r^2 = 3^2 + 4^2r^2 = 9 + 16r^2 = 25r = 5Once the essential computations have been made to attain r, x and y, one can then proceed towards analyzing additional trigonometric functions.
For such an endeavor to be accomplished successfully requires adherence to a series of practices that are comprehensively delineated beneath:sin G = y/r = -4/5cos G = x/r = -3/5tan G = y/x = 4/3 (already given)csc G = r/y = -5/4sec G = r/x = -5/3cot G = x/y = -3/4*May this assist you! In case there are any additional queries lingering in your mind, do not hesitate to inform me.
22. trigonometric functions
Answer:
There are six Trigonometric Fucntions
which are,
Sine
Cosine
Tangent
Cotangent
Secant
Cosecant
23. Inverse trigonometric functions examples
Answer:
Inverse Trigonometric Functions Derivatives
Inverse Trig Function dy/dx
y = sin-1(x) 1/√(1-x2)
y = cos-1(x) -1/√(1-x2)
y = tan-1(x) 1/(1+x2)
y = cot-1(x) -1/(1+x2)
24. what is the formula for trigonometric function
Trigonometric Functions:
sin = opposite/ hypotenuse
cos = adjacent/ hypotenuse
tan = opposite/ adjacent
cot = adjacent/ opposite
sec = hypotenuse/ adjacent
csc = hypotenuse/ opposite
25. What are the 6 trigonometric functions?
The six trigonometric functions are sine, cosine, tangent, cotanget, secant and cosecant.
26. what are the formula of trigonometric function
Formula for trigonometric function:
[tex]Sin=\frac{y}{r}[/tex]
[tex]Cos=\frac{x}{r}[/tex]
[tex]Csc=\frac{r}{y}[/tex]
[tex]Sec=\frac{y}{x}[/tex]
[tex]Tan=\frac{y}{x}[/tex]
[tex]Cot=\frac{x}{y}[/tex]
Hope this helps =)|
27. 6 trigonometric functions.
cosθ = x
sinθ = y
tanθ = y/x
cotθ = x/y
cscθ = 1/y
secθ = 1/xsine
cosine
tangent
cotangent
co-secant
secant
28. derivative of trigonometric functions
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29. trigonometric function
A. 5 - 8 - 6 - 10 - 5
B. 7 - 4 - 2 - 9 - 5
C. 4 - 13 - 14 - 12 - 10
#CARRY ON LEARNING30. What are the trigonometric functions?
There are six functions but only three primary ones you need to understand
1.Sine (sin)
2.Cosine (cos)
3.Tangent (tan)
The other three are not used as often
1.Secant (sec)
2.Cosecant (csc)
3.Cotangent (cot)