Applications of Trigonometry Class 10 

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speed of the plane is calculated by the distance travelled by the plane in 10 sec =(4500m-1500m)/10s=3000m/10s=300 m/s. ok

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In ∆BAD, tan(angle D)=Opposite/Adjacent Or,tan(angle D)=AB/AD From the trigonometric table, tan(30°)=1/√3 Or,75/AD=1/√3=75√3=15m In ∆BAC, tan(45°)=1 Or,AB/AC=1 Or,75/AC=1 Or,AC=75m Or, Distance between two ships=AC-AD=75-15=60m

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If it is a tringle with 30°:60°: 90° The opposite side's ratio= 1:√3:2 And for 45°:45°:90° Side's ratio=1:1:√2

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First position of plane has distance from the point of observation equal to 1500 m and after 10s the distance from observer equal to 4500m and to find speed v need to use d/t formula. Time will be 10s and distance moved at the time is 4500-1500 =3000. Now substituting on formula 3000/10 we get 300m/s as answer

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First we have to find the length between point of observation and the plane before the trip ,then we find the length between point of observation and the plane after the trip. Finally dividing it by the time we get 300m/s. Isn't it?

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Here is the summary and related questions: The video discusses how to apply trigonometry to measure heights and distances without directly measuring them. It covers examples such as finding the height of a tall building, the width of a river, and the distance between ships using trigonometric ratios. Key moments: 00:00 Trigonometry can be used to measure heights and distances without physically measuring them by utilizing ratios and angles in right angle triangles. Understanding trigonometric ratios like sine, cosine, and tangent is crucial for these calculations. -The video explains how to apply trigonometry to measure heights and distances without direct measurement, simplifying complex calculations using ratios and angles in right angle triangles. -Understanding trigonometric ratios such as sine, cosine, and tangent is fundamental for accurately calculating heights and distances in trigonometry, making the process more efficient and practical. 06:09 To find the height of a building, use trigonometric ratios like tan theta with known values to calculate the height accurately. The process involves identifying the unknown, applying the appropriate ratio, and solving for the height. -Calculating the height of a building using trigonometry. It involves identifying the angle, applying tan theta, and solving for the height accurately. -Visualizing and solving for the angular elevation of the Sun. By drawing a diagram, using tan theta with known values, and finding the angle accurately. -Understanding the concept of angle of depression. Explaining how to calculate the angle from the top of a building using trigonometry and known values. 12:48 Understanding angles of depression and elevation helps in solving trigonometry problems involving heights and distances. By visualizing and applying trigonometrical ratios to right angle triangles, complex questions can be easily solved. -Explaining the concept of angles of depression and elevation and their significance in trigonometry. Visualizing and drawing diagrams to solve height and distance problems efficiently. -Analyzing the given question about finding the width of a river using angles of depression, heights, and trigonometry. Breaking down the problem into smaller parts for systematic solution. 19:30 The video explains how to use trigonometric ratios to find unknown sides in triangles. In one example, the width of a river is calculated by adding the lengths found using trigonometry. -Using trigonometric ratios to find unknown sides in triangles. The video demonstrates using ratios like tan 30 and tan 45 to calculate side lengths. -Calculating the width of a river using trigonometry. By adding the lengths found for X and Y, the width of the river is determined. -Applying trigonometry to solve a real-world problem. The video presents a scenario involving a lighthouse and two ships to demonstrate trigonometric calculations. 26:38 To find the distance between two ships, trigonometry is used to set up and solve equations based on angles and side ratios, resulting in the distance of 54.90 meters. For a statue and pedestal, trigonometric ratios are applied to determine the height of the pedestal as 1.2 meters. -Trigonometry is utilized to calculate the distance between two ships by setting up and solving equations based on angles and side ratios, resulting in a distance of 54.90 meters. -Applying trigonometric ratios in a scenario involving a statue and pedestal to determine the height of the pedestal as 1.2 meters by setting up and solving equations based on angles and side ratios. 33:38 To find the height of a hill, rationalize the denominator in the calculation to simplify the process and get an accurate result efficiently. Trigonometry can help determine distances and heights in geometric problems involving angles of elevation and depression. -Rationalizing the denominator simplifies calculations with irrational numbers, enhancing accuracy and efficiency in mathematical solutions. -Trigonometry aids in solving geometric problems by utilizing angles of elevation and depression to determine distances and heights in a structured manner. 40:21 The height of the hill is found to be 40 meters and the distance from the ship to the hill is 17.32 meters, demonstrating a simple application of trigonometry in real-world scenarios. -Trigonometry is used to find the height of the hill and the distance from the ship, showcasing practical applications of mathematical concepts. -The video encourages viewers to attempt solving a question involving the speed of a plane and provides resources for further practice and learning in heights and distances.

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Sir the answer is 300 m/s where x=1500m and y=1500m so, x+y=1500+1500=3000m then by the formula speed=distance/time, time is given 10s and distance 3000m=3000m/10s=one 0 is cancel 300m/s answer....

We,know tan(x)=Opposite/Adjacent=10/10√3=1/√3 From the trigonometric table, 1/√3=tan(30°) Or,The angular elevation of sun is 30°

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