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45°- 45° - 90°. 30° - 60° - 90°. Area of Parallelogram. Area of Triangles. Pythagorean Theorem. 10. 10. 10. 10. 10. 20. 20. 20. 20. 20. 30. 30. 30. 30. 30. 40. 40. 40. 40. 40. 50. 50. 50. Special Right Triangles and Area.
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45°- 45° - 90° 30° - 60° - 90° Area of Parallelogram Area of Triangles Pythagorean Theorem 10 10 10 10 10 20 20 20 20 20 30 30 30 30 30 40 40 40 40 40 50 50 50 Special Right Triangles and Area
In triangle ABC, is a right angle and 45°. Find BC. If you answer is not an integer, leave it in simplest radical form.
Find the length of the leg. If your answer is not an integer, leave it in simplest radical form.
Find the value of the variable. If your answer is not an integer, leave it in simplest radical form.
60° 8 x 30° y Find the value of each variable. Shorter Leg 8 = 2x x = 4 Longer Leg y = x√3 y = 4√3
Find the lengths of a 30°-60°-90° triangle with hypotenuse of length 12. 60° 12 x 30° y Shorter Leg 12 = 2x x = 6 Longer Leg y = x√3 y = 6√3
The longer leg of a 30°-60°-90° has length 18. Find the length of the shorter leg and the hypotenuse. 30° 60° 18 x y Shorter Leg Hypotenuse
Find the area of a parallelogram with the given vertices. P(1, 3), Q(3, 3), R(7, 8), S(9, 8) 10 units2
Find the length of the missing side. The triangle is not drawn to scale.
Find the length of the missing side. The triangle is not drawn to scale.
Find the length of the missing side. The triangle is not drawn to scale.
Find the area of the triangle. Leave your answer in simplest radical form.
A triangle has sides that measure 33 cm, 65 cm, and 56 cm. Is it a right triangle? Explain It is a right triangle because the sum of the squares of the shorter two sides equals the square of the longest side.
