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What are the uses of similar triangles in real life?
Similar triangles have various real-life applications, including in architecture and construction for scaling designs and ensuring structures are proportionate. They are also used in navigation and surveying to determine distances or heights that are difficult to measure directly, like the height of a building or a mountain. Additionally, similar triangles play a role in photography and computer graphics for creating accurate perspectives and projections. In everyday scenarios, they can help in tasks such as resizing objects or images while maintaining their proportions.
I have no idea how to go about this question on my geometry homework! Can someone help me?
The two triangles shown are similar triangles. Numerically, the ratio computed by dividing the length of any side of tower triangle by the length of the corresponding side of the walking stick (similar) triangle will be the same value. Therefore, when the length of the tower shadow is divided by the length of the walking stick shadow, that ratio will be the exactly same as the tower height divided by the walking stick height. (length of tower shadow)/(length of walking stick shadow) = (tower's height)/(walking stick height) tower's height = {(length of tower shadow)/(length of walking stick shadow)}*(walking stick height)
Two triangles are similar. Find the values of x and y when the height is 6.5 and base is x on the first triangle second triangle the height is 26 and base is y. area is 7.8 and could belong to either?
Their values are: x = 2.4 and y = 0.6 which is a ratio of 4 to 1 and both triangles have an area of 7.8 square units
What is a triangle with height called?
All triangles have a height because the area of any triangle is 0.5*base*perpendicular height
Are two triangles congruent if they have same area?
Not necessarily. You find the area of a triangle with the formula 1/2*base*height=Area. Imagine two triangles, one with 3 inches for both the base and height, and one with 4.5 inches for the height and 2 inches for the base. Both of these triangles will have 9 sq. in. for their areas, but they are not congruent.
What is an objects height measure of?
meters
What are the uses of similar triangles in real life?
Similar triangles have various real-life applications, including in architecture and construction for scaling designs and ensuring structures are proportionate. They are also used in navigation and surveying to determine distances or heights that are difficult to measure directly, like the height of a building or a mountain. Additionally, similar triangles play a role in photography and computer graphics for creating accurate perspectives and projections. In everyday scenarios, they can help in tasks such as resizing objects or images while maintaining their proportions.
Which is the height of the triangle?
As for all objects, vertically measure it.
Are two objects of the same height but with different proportions considered to be similar in size?
Yes, two objects of the same height but with different proportions are considered to be similar in size.
What helps you measure the height of very tall objects?
Trigonometry
What helps you to measure the height of very tall objects?
trigonometry
How do you measure the volume of irregular floating objects?
To do this, you will need to measure the length and the width and the height and your have your answer to the volume.
How can you recognize similar figures?
They have the same measure of base and height.
What is the best app to measure the height of a person in a photo?
One of the best apps to measure the height of a person in a photo is "EasyMeasure." This app uses the camera on your device to estimate the height of objects in the photo.
Who uses a hipsometer?
People who need to measure height of objects such as trees, buildings, etc.
I have no idea how to go about this question on my geometry homework! Can someone help me?
The two triangles shown are similar triangles. Numerically, the ratio computed by dividing the length of any side of tower triangle by the length of the corresponding side of the walking stick (similar) triangle will be the same value. Therefore, when the length of the tower shadow is divided by the length of the walking stick shadow, that ratio will be the exactly same as the tower height divided by the walking stick height. (length of tower shadow)/(length of walking stick shadow) = (tower's height)/(walking stick height) tower's height = {(length of tower shadow)/(length of walking stick shadow)}*(walking stick height)
How did ancient people checked the height of the pyramids?
Thales of Miletos is the ancient Greek philosopher/ mathematician who first calculated the height of the Great Pyramid of Giza with the use of trigonometry and similar and right triangles.
