andy2461
06.02.2021 •
Mathematics
H(x) = x ^ 2 - 2 g(x) = 4x + 1 Find (h•g)(x)
Solved
Show answers
More tips
- S Sport When and Where Will the 2014 World Cup be Held?...
- C Computers and Internet How to Choose a Monitor?...
- S Style and Beauty How to Get Rid of Peeling Nails: Natural Remedies...
- S Science and Technology Understanding Magnetic Storms: A Guide to This Natural Phenomenon...
- F Family and Home What is Most Important in Men s Lives?...
- G Goods and services Which TV is better - LCD or Plasma?...
- C Computers and Internet Are there special gaming mice?...
- G Goods and services LED-подсветка в LCD-телевизорах: 5 причин, почему она лучше других технологий...
- C Computers and Internet Keep Your Mouse Pad Clean: The Right Way to Clean It?...
- C Computers and Internet 3D Glasses! What is this thing?...
Answers on questions: Mathematics
- M Mathematics Use an area model to explain the product of 4.6 and 3 . write the product in standard form word form and expanded form...
- M Mathematics Two numbers differ by 13 and the sum of their squares is 125 find the numbers...
- M Mathematics Question 1 (5 points) V5x3 Rewrite the radical expression using rational exponents. A) 5x: B) (5x): C) (5x); D) (5x)...
- M Mathematics Use the square root property to solve the equation. (x + 1)2 +8 = 0...
- C Computers and Technology Which one of the following is not a type of reference method that uses a terminal digit system? 1) account payables 2) medical records management 3) account receivables 4) insurance...
- B Biology The area on the food label that provides a list of specific nutrients obtained in one serving of the food is referred to as...
- M Mathematics Quadrilateral ABCD is inscribed in this circle. What is the measure of angle A? Enter your answer in the box....
Ответ:
a) sin(2θ) = -√3/2
cos(2θ) = -1/2
tan(2θ) = √3
b) sin(2θ) = 4√5/9
cos(2θ) = 1/9
tan(2θ) = 4√5
Step-by-step explanation:
a) cos θ = -1/2
First, find sin θ using Pythagorean identity:
sin² θ + cos² θ = 1
sin² θ + (-1/2)² = 1
sin² θ + 1/4 = 1
sin² θ = 3/4
sin θ = ±√3/2
Since θ is in Quadrant II, sin θ > 0, so sin θ = +√3/2.
Now use double angle formulas to find each expression.
sin(2θ) = 2 sin θ cos θ
sin(2θ) = 2 (√3/2) (-1/2)
sin(2θ) = -√3/2
cos(2θ) = cos² θ − sin² θ
cos(2θ) = (-1/2)² − (√3/2)²
cos(2θ) = 1/4 − 3/4
cos(2θ) = -1/2
tan(2θ) = sin(2θ) / cos(2θ)
tan(2θ) = (-√3/2) / (-1/2)
tan(2θ) = √3
b) sin θ = -2/3
Repeat same steps as before.
First, find cos θ using Pythagorean identity:
sin² θ + cos² θ = 1
(-2/3)² + cos² θ = 1
4/9 + cos² θ = 1
cos² θ = 5/9
cos θ = ±√5/3
Since θ is in Quadrant III, cos θ < 0, so cos θ = -√5/3.
Now use double angle formulas to find each expression.
sin(2θ) = 2 sin θ cos θ
sin(2θ) = 2 (-2/3) (-√5/3)
sin(2θ) = 4√5/9
cos(2θ) = cos² θ − sin² θ
cos(2θ) = (-√5/3)² − (-2/3)²
cos(2θ) = 5/9 − 4/9
cos(2θ) = 1/9
tan(2θ) = sin(2θ) / cos(2θ)
tan(2θ) = (4√5/9) / (1/9)
tan(2θ) = 4√5