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How do you solve if angle x and angle y are complementary and angle z and angle q are complementary and angle x and angle z are congruent then angle y is congruent to angle q?
x and y are complementary so x + y = 90 and so y = 90 - x z and q are complementary so z + q = 90 and so q = 90 - z x = z so 90 - x = 90 - z that is y = q
If angle p is a right angle and angle p and q form a linear pair then what angle is q?
Angle q will be less than 90 degrees because a right angle is 90 degrees and the 3 angles in a triangle add up to 180 degrees.
In triangle pqr the measure of angle p is 36 degrees the measure of angle q is five times the measure of angle r find angle q and angle r?
Sum of all three angles is 180 degrees. p = 36 so q+r = 180-36 = 144 degrees. Now, q = 5r so 144 = q+r = 5r+r = 6r so r = 144/6 = 24 and then q = 5r = 5*24=120 Answer: q = 120 deg, r = 24 deg
When p is larger than q and both are positive the sign of the x-term of a trinomial will be?
positive
What are the lengths of the diagonals of the above right triangles?
A triangle has three sides measured in linear units and three angles measured in degrees or radians whose sum is 180 degrees or p (pi) radians, respectively. This book only uses degrees for angle measurement. Recall a right triangle has one angle = 90 degrees, so the sum of the other two must = 90. Two special triangles: A Square with sides = x and a diagonal forms two isosceles right triangles. (An isosceles triangle has two sides equal and the angles opposite them are equal.) Apply the Pythagorean Theorem to find the length of the diagonal. x2 + x2 = (diagonal) 2 2x2 = (diagonal) 2 diagonal = For a right triangle with 45 and 90 degree angles and length of legs, x, the length of the hypotenuse is . Example 1.What is the length of the hypotenuse of a right triangle with legs of length 3 inches each? Solution 3 Deriving a 30 - 60 - 90 triangle An equilateral triangle has all sides equal, thus all angles are equal. Each angle is 60 degrees. Apply Pythagorean Theorem to find the height. If each side is 2x in length, then (2x) 2 = x2 + (height) 2 4x2 - x2 = (height) 2 height = xAn acute angle q , has measurement between 0o < q < 90o Since a right angle is 90o, then the other two interior angles of a right triangle must be acute angles. Trigonometric ratios: In a right triangle with angle q , Sine q = sin q = length of side opposite q / Length of hypotenuse Cosine q = cos q = length of side adjacent q / Length of hypotenuse Tangent q = tan q = length of side opposite q / Length of side adjacent q Find the exact values using the information obtained for special right triangles: sin 45o = cos 45o = tan 45o = sin 30o = cos 30o = tan 30o = sin 60o = cos 60o = tan 60o = More examples in class. When triangles are not special 45o or 30-60-90o triangles, use your calculator. Set calculators to degree mode! EX. 2: Use a calculator to find the following. a) sin 15o = b) cos 29.5o = c) tan 37.2o =When the angle is not given, but the length of the sides are given, we can find the angle measurement by taking the inverse of the trig functions. Recall the inverse of f(x) is written f -1(x). For a right triangle with hypotenuse of length c, and legs of length b opposite q and length a adjacent to q : q = sin-1(b/c) means sin q = b/c q = cos-1(a/c) means cos q = a/c q = tan-1(b/a) means tan q = b/a Practice using your calculator. Exercise 3: Find: a) sin-1(1/2) = b) cos-1(2/3) = c) tan-1(1)
