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A right square pyramid has an altitude of 10 and each side of the base is 6. To the nearest tenth of a centimeter, what is the distance from the top of the pyramid, to each vertex of the base?

A Right Square Pyramid Has An Altitude Of 10 And Each Side Of The Base Is 6 To The Nearest Tenth Of A Centimeter What Is The Distance From The Top Of The Pyrami class=

Sagot :

jessventura48

Answer:

10.9

Step-by-step explanation:

I just used a pyramid calculator online and inputed the base and height.

The distance from the top of the pyramid, to each vertex of the base would be 10.5 unit.

What is Pythagoras' Theorem?

If ABC is a triangle with AC as the hypotenuse and angle B with 90 degrees then we have:

[tex]|AC|^2 = |AB|^2 + |BC|^2[/tex]

where |AB| = length of line segment AB. (AB and BC are rest of the two sides of that triangle ABC, AC being the hypotenuse).

A right square pyramid has an altitude of 10 and each side of the base is 6. we need to find the slant height of the pyramid.

From the Pythagoras' theorem

[tex]|AC|^2 = |AB|^2 + |BC|^2[/tex]

[tex]s^2 = h^2 + (b/2)^2\\\\s^2 = 10^2 + (6/2)^2\\\\s^2 = 100 + 9\\\\s^2 = 109\\\\s = \sqrt109\\\\s = 10.5[/tex]

Thus, the distance from the top of the pyramid, to each vertex of the base would be 10.5 unit.

Learn more about Pythagoras' theorem here:

https://brainly.com/question/12105522

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