📏 trigonometry

1. Problem 4: Find the lengths marked $a$ and $b$ in triangle $ABC$ where $\angle C=90^\circ$, $AB=2$ cm and $\angle B=45^\circ$. 1. In a right triangle the non-right angles sum to

1. **Calculate the height of a tree whose shadow is 20 m shorter when the sun's elevation angle changes from 30° to 60°**. Let the height of the tree be $h$ meters, the shadow leng

1. Given a right triangle with angles 60\degree, 90\degree, and the sides labeled as follows: side opposite 60\degree angle = $x$, side adjacent to 60\degree angle = 6, and hypoten

1. সমস্যা: যদি $\cot x + \csc x = p$ হয়, তবে দেখাতে হবে যে $$ (p^2+1) \cos x + (p^2+1) \sin x = p + 1 - 2.$$ \n\n2. দেওয়া আছে, $\cot x = \frac{\cos x}{\sin x}$ এবং $\csc x = \fra

1. The most common angle formulas are for right triangles and trigonometric identities. 2. In a right triangle, the sum of angles is $180^\circ$ and one angle is $90^\circ$. So, if

1. **Problem Statement:** Find $\cos 66^\circ$ using the given right-angled triangle. 2. **Recall the definition:** $\cos \theta = \frac{\text{length of adjacent side}}{\text{lengt

1. The problem asks to write \( \cos 66^\circ \) as a fraction using the right-angled triangle provided. 2. Recall that \( \cos \theta = \dfrac{\text{length of adjacent side}}{\tex

1. Stating the problem: Verify if $$\frac{2\csc^2 A - 2\csc A \cot A}{-2\cot^2 A + 2\csc A \cot A} = \sec A$$. 2. Factor the numerator and denominator:

1. **State the problem:** We need to find the size of angle $\theta$ in a right triangle. 2. **Identify the known sides:** The side opposite $\theta$ is 37.5 cm and the side adjace

1. **State the problem:** We need to find the size of angle $x$ in a right-angled triangle where the right angle is at the bottom left corner. 2. **Identify sides relevant to angle

1. **State the problem:** We need to find the size of angle $\theta$ in a triangle with two sides measuring 39.5 cm and 45.3 cm, where the angle $\theta$ is between these two sides

1. **State the problem:** We have a right-angled triangle with side lengths 3 cm (vertical), 7 cm (horizontal), and an unknown hypotenuse. Angle $\theta$ is located at the bottom-r

1. Let's first solve Example 2: Calculate the length of side AB. Given: Right triangle ABC with angle C = 50°, side BC = 9 cm and angle B is 90°.

1. **State the problem:** Calculate the length of the hypotenuse for each right triangle, given one angle (other than the right angle) and the length of a side adjacent to the righ

1. State the problem: We want to find the value of $$X = \cos(57^\circ) \cos(27^\circ) + \sin(57^\circ) \sin(27^\circ)$$

1. We are asked to convert an angle of 30° into radians. 2. Recall the formula to convert degrees to radians is $$\text{radians} = \text{degrees} \times \frac{\pi}{180}$$.

1. **Problem statement:** Convert 30° into radians and find the arc length $l$ when radius $r=6$ cm. 2. **Conversion formula:** Radians $= \frac{\pi}{180} \times$ degrees.

1. The problem is to find the value of $\sin 60^\circ$. 2. Recall that $60^\circ$ is a special angle in trigonometry.

1. **Problem Statement:** Amal is at point A, directly north of Bimal at point B. A statue S is in the field with a bearing 144° from A. Angle ABS is given as 54°, distance AS = 80

1. **State the problem:** Two poles stand opposite each other across a road 80 m wide.

16. Problem: Identify the correct trigonometric identity or inequality among the options. Solution: