Conduit fabrication lvl 1 lesson 2
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: sin θ = 0.8660hypotenuse = 0.25Find: opposite =
0.8660X0.25=0.2165
Maximum value of the cos θ occurs at ? , and its minimum value occurs at ? .
0° / 90°
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.) Given: adjacent = 10opposite = 10Find: tan θ =
10/10=1
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.) Given: adjacent = 10opposite = 100Find: tan θ =
100/10=10
Given the following information, solve for the missing value.Given: adjacent = 10opposite = 1,000Find: tan θ =
1000/10=100
Given the following information, solve for the missing value. (Round the FINAL answer to the nearest degree.) Given: sin θ = 0.7071hypotenuse = 100Find θ.
sin^-1(0.7071)=44.9
Given the following information, solve for the missing value. (Round to the nearest degree.)Given: sin θ = 0.8660hypotenuse = 0.25Find: θ =
sin^-1(0.8860)=59.9
The Pythagorean Theorem states that the ? of the hypotenuse of any right triangle is equal to the ? of the squares of the other two sides.
square / sum
If a building casts a shadow 150 feet from its base, and a yardstick casts a shadow of 2 feet, how tall is the building? Use trigonometric functions to solve the problem. Select one: a. 100' b. 150' c. 225' d. 300'
tan θ = 3/2 = 1.5 Height = tan θ × adjacent = 1.5 × 150' = 225' The correct answer is: 225'
Tan θ is sometimes referred to as the slope of a decline or rise. What would be the angle of the rise of a bridge that rose 500 feet per one-half mile? Select one: a. 0.1894° b. 10.7° c. 5.28° d. 79.3°
tan θ = 500/2,640= 0.1894 10.72° The correct answer is: 10.7°
Using the tan function, complete the following equations and match with the correct answer shown below: I. opp/adj II. opp/hyp III. opp/tan θ IV. tan θ × adj tan θ =Answer 1Choose...III.II.IV.I. opp =Answer 2Choose...III.II.IV.I. adj =Answer 3Choose...III.II.IV.I.
tan θ = → I., opp = → IV., adj = → III.
The term ? is used to identify the reference point or angle.
theta
Since the ratios for sides of triangles are the same, when the angles are the same, ? have been developed which show these ratios for every angle encountered in a triangle.
trigonometric tables
The maximum value for the tan function is equal to ? and occurs at ? .
undefined / 90°
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.) Given: adjacent = 10opposite = 1,000Find: hypotenuse =
√(1000^2+10^2)
Given the following information, solve for the missing value. (Round the FINAL answer to one decimal place.)Given: adjacent = 10opposite = 100Find: hypotenuse =
√(100^2+10^2)=100.5
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.) Given: adjacent = 10opposite = 10Find: hypotenuse =
√(10^2+10^2)=14.1421
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.) Given: hypotenuse = 10adjacent = 7Find: opposite =
√(10^2-7^2)=7.14
Given the following information, solve for the missing value. Given: hypotenuse = 150adjacent = 90 Find: opposite =
√(150^2-90^2)=120
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.)Given: hypotenuse = 250adjacent = 225Find: opposite =
√(250^2-225^2)=108.97
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.) Given: hypotenuse = 25adjacent = 5Find: opposite =
√(25^2-5^2)=24.49
Given the following information, solve for the missing value. Given: adjacent = 4opposite = 3Find: hypotenuse =
√(4^2+3^2)=5
Given the following information, solve for the missing value. Given: hypotenuse = 5adjacent = 3Find: opposite =
√(5^2-3^2)=4
Given the following information, solve for the missing value. Given: adjacent = 6opposite = 8Find: hypotenuse =
√(8^2+6^2)=10
The maximum value of the cos θ is equal to ? , and the minimum value is ? .
. 1 / 0
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.) Given: sin θ = 0.7071hypotenuse = 100Find: opposite =
0.7071x100=70.71
Given the following information, solve for the missing value. (Round the FINAL answer to one decimal place.)Given: θ = 51°opposite = 15Find: hypotenuse =
15/sin(51)=19.3
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.) Given: sin θ = 0.5446opposite = 160Find: hypotenuse =
160/0.5446=293.79
The sum of all the angles in any triangle always equals ? .
180°
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: hypotenuse = 250adjacent = 225Find: cos θ =
225/250
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: adjacent = 4opposite = 3 Find: tan θ =
3/4=0.75
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: hypotenuse = 5adjacent = 3Find: cos θ =
3/5=0.6
Given the following information, solve for the missing value. (Round the FINAL answer to two decimal places.)Given: θ = 20°opposite = 45Find: hypotenuse =
45/sin(20)=131.58
Given the following information, solve for the missing value. (Round the FINAL answer to one decimal place.) Given: hypotenuse = 25adjacent = 5Find: cos θ =
5/25=0.2
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.) Given: hypotenuse = 10adjacent = 7Find: cos θ =
7/10=0.7
Given the following information, solve for the missing value. (Round the FINAL answer to three decimal places.)Given: adjacent = 6opposite = 8Find: tan θ =
8/6=1.333
The maximum value of sin θ is ? . The minimum value of sine θ is ? .
90 / 0
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.) Given: hypotenuse = 150adjacent = 90Find: cos θ =
90/150
One angle of a right triangle is always a ? angle.
90°
Sin θ will have its maximum value at ? and its minimum value at ? .
90° / 0°
θ in a right triangle equals 36°. What are the values of the other two angles?
90° / 54°
Match the correct sides and angle for this right triangle.
Adjacent → c., Hypotenuse → a., Opposite → b., θ → d.
Understanding trigonometry will improve one's understanding of designing and fabricating conduit systems.
True
What is the trigonometric formula for the cos function?
adj / hyp
The side next to the reference angle is called the ? side.
adjacent
The cos θ is equal to the ? side divided by the ? .
adjacent / hypotenuse
Write the Pythagorean Theorem as a mathematical formula.
c2 = a2 + b2
Using the cosine function, complete the following equations and match with the correct answer shown below: I. adj/cos θ II. adj/hyp III. cos θ × hyp IV. opp/hyp cos θ =Answer 1Choose...III.II.I. adj =Answer 2Choose...III.II.I. hyp =Answer 3Choose...III.II.I.
cos θ = → II., adj = → III., hyp = → I.
The side opposite the right angle is called the ? side.
hypotenuse
Write the trigonometric formula for the tan function.
opp/adj
Write the trigonometric formula for the sine function.
opp/hyp
The side opposite the reference angle is called the ? side.
opposite
The tan θ is equal to the ? side divided by the ? side.
opposite / adjacent
The sine of θ is equal to the ? divided by the ? .
opposite / hypotenuse
Using the sin function, complete the following equations and match with the correct answer shown below:sin θ =Answer 1Choose...IV.II.III.I. hyp =Answer 2Choose...IV.II.III.I. opp =Answer 3Choose...IV.II.III.I.
sin θ = → II., hyp = → III., opp = → IV.
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: θ = 20°opposite = 45Find: sin θ =
sin(20)=0.34
Given the following information, solve for the missing value. (Round the FINAL answer to four decimal places.)Given: θ = 51°opposite = 15Find: sin θ =
sin(51)=0.7771
Given the following information, solve for the missing value. (Round the FINAL answer to the nearest degree.) Given: sin θ = 0.5446opposite = 160Find θ.
sin^-1(0.5446)=32.99
