📏 trigonometry

1. Le problème semble concerner la simplification ou la manipulation d'une expression impliquant le sinus, probablement $-\sin(x) + \sin(x)$. 2. La formule importante ici est la pr

1. **State the problem:** We need to find the angle $x$ in a right triangle $UTS$ where the right angle is at $T$. 2. **Given:** Side $TS = 4.3$, hypotenuse $US = 9.8$, and angle $

1. **State the problem:** Given that $\cos \theta < 0$ and $\sin \theta = -\frac{2}{3}$, find $\tan \theta$ and the coordinates of point $P = (x, y)$ on the unit circle. 2. **Recal

1. **Problem statement:** Express $\sin 325^\circ$ in terms of $p$ given that $\sin 35^\circ = p$. 2. **Recall the sine function property:**

1. Problem: Verify the given trigonometric identities for angles 75° and 15°. 2. Recall formulas and values:

1. **Problem statement:** Find the exact value of each expression using a calculator or exact trigonometric identities. 2. **Part (a):** Calculate $\cos(\sin^{-1}(\frac{3}{5}))$.

1. **Problem Statement:** Find the value of $\sin K$ in the right triangle with vertices $K$, $J$, and $I$, where side $KJ = \sqrt{14}$, side $KI = 7$, and $J$ is the right angle.

1. **State the problem:** We need to find the value of $\sin K$ in a right triangle where the side opposite angle $K$ is 7 and the hypotenuse is $\sqrt{14}$. 2. **Recall the defini

1. The problem is to solve for $x$ in a right triangle with sides 8, 15, and 17, where $x$ is the angle opposite the side of length 8. 2. We use the sine function, which relates an

1. **Problem a:** Calculate the length of side $x$ in a triangle with angles 38° and 44°, and side 10 opposite the 38° angle. 2. Use the Law of Sines formula: $$\frac{a}{\sin A} =

1. **Problem a:** Calculate the length of side $x$ in a triangle with angles 44° and 38°, and the side adjacent to the 44° angle is 10 units. 2. **Step 1:** Identify the third angl

1. **State the problem:** We have a right triangle with angle $A = 43^\circ$, side $AC = 650$ yards adjacent to angle $A$, and we want to find side $AB = a$, which is opposite angl

1. **State the problem:** We have a right triangle with a hypotenuse of length 19, an angle of 74°, and we need to find the length of the side opposite the 74° angle, labeled $x$.

1. We are given the equation $$2\cos^2\theta + \cos\theta - 1 = 0$$ and asked to find the value of $$\sin\theta$$. 2. This is a quadratic equation in terms of $$\cos\theta$$. Let $

1. **State the problem:** Simplify the expression $$\frac{\sqrt{1-\cos^2 x}}{\cos x}$$. 2. **Recall the Pythagorean identity:** $$\sin^2 x + \cos^2 x = 1$$, which implies $$1 - \co

1. **State the problem:** We need to find the depth of a lunar crater given the length of its shadow and the angle of elevation of the sun. 2. **Identify the right triangle:** The

1. **Problem statement:** You are standing at the edge of the Grand Canyon, 1.5 m above the cliff edge. The canyon is 498 m wide horizontally, and the angle of depression to the bo

1. **Problem statement:** Express each given trigonometric value in terms of an angle $\alpha$ between $0^\circ$ and $90^\circ$. 2. **Key formulas and rules:**

1. **Problem statement:** We have three right triangles with given sides and angles, and we need to find $\sin A$, $\cos A$, and $\tan A$ for each triangle. 2. **Recall definitions

1. **State the problem:** We have a right triangle formed by a pole leaning against a wall. The pole is the hypotenuse with length 15 m, and the distance from the wall to the foot

1. **Problem statement:** We want to find the vertical position of the tip of the hour hand of length 12 cm as it rotates over 72 hours, starting at the 9 o'clock position. 2. **Un