Robert Edward Grant
👤 PersonAppearances Over Time
Podcast Appearances
Some of them have a step architecture, others have a smooth slope going up the sides of the pyramids, but I looked at it more from the slope angle. So why was the slope angle specifically chosen? And you can look at pyramids all over the world. They all have different slope angles. So I was trying to understand what that could possibly be as a result of.
Some of them have a step architecture, others have a smooth slope going up the sides of the pyramids, but I looked at it more from the slope angle. So why was the slope angle specifically chosen? And you can look at pyramids all over the world. They all have different slope angles. So I was trying to understand what that could possibly be as a result of.
Some of them have a step architecture, others have a smooth slope going up the sides of the pyramids, but I looked at it more from the slope angle. So why was the slope angle specifically chosen? And you can look at pyramids all over the world. They all have different slope angles. So I was trying to understand what that could possibly be as a result of.
So then I looked at it and said, okay, well, maybe this is encoding some knowledge of music and an architectural principle that relates to that. So I looked at the height over the base. So you could take the height over the base or the height over the one half base creates a right triangle.
So then I looked at it and said, okay, well, maybe this is encoding some knowledge of music and an architectural principle that relates to that. So I looked at the height over the base. So you could take the height over the base or the height over the one half base creates a right triangle.
So then I looked at it and said, okay, well, maybe this is encoding some knowledge of music and an architectural principle that relates to that. So I looked at the height over the base. So you could take the height over the base or the height over the one half base creates a right triangle.
And that right triangle, the length of this line versus the length of this line will determine the slope of this line, right? And therefore the angle of this line. And we have very exacting measurements for the Great Pyramids angle of 51.85397 degrees.
And that right triangle, the length of this line versus the length of this line will determine the slope of this line, right? And therefore the angle of this line. And we have very exacting measurements for the Great Pyramids angle of 51.85397 degrees.
And that right triangle, the length of this line versus the length of this line will determine the slope of this line, right? And therefore the angle of this line. And we have very exacting measurements for the Great Pyramids angle of 51.85397 degrees.
We know that the second pyramid, Khafre Pyramid, which has been the subject of some recent controversy and really interesting stuff too about this underground structure. We can talk about that in a little bit. And my findings related to that also. But that has a slope angle of 53.13 degrees versus the 51.85. So why the difference?
We know that the second pyramid, Khafre Pyramid, which has been the subject of some recent controversy and really interesting stuff too about this underground structure. We can talk about that in a little bit. And my findings related to that also. But that has a slope angle of 53.13 degrees versus the 51.85. So why the difference?
We know that the second pyramid, Khafre Pyramid, which has been the subject of some recent controversy and really interesting stuff too about this underground structure. We can talk about that in a little bit. And my findings related to that also. But that has a slope angle of 53.13 degrees versus the 51.85. So why the difference?
And it makes Khafre Pyramid actually look more beautiful than the Great Pyramid does, interestingly. And then the third pyramid, Menkaure, has a 51.34 degree angle. So I, of course, went to the work of trying to figure out, okay, what would be the Pythagorean triple relationship that would create those exact angles?
And it makes Khafre Pyramid actually look more beautiful than the Great Pyramid does, interestingly. And then the third pyramid, Menkaure, has a 51.34 degree angle. So I, of course, went to the work of trying to figure out, okay, what would be the Pythagorean triple relationship that would create those exact angles?
And it makes Khafre Pyramid actually look more beautiful than the Great Pyramid does, interestingly. And then the third pyramid, Menkaure, has a 51.34 degree angle. So I, of course, went to the work of trying to figure out, okay, what would be the Pythagorean triple relationship that would create those exact angles?
And what proportion of this line versus this line would you have to have to have those exact angles? And I found that there was a pattern. And the pattern for the smallest pyramid was five height over four base, right? And that created a 51.34 degree angle. I found that Khafre pyramid to have a 53.13 degree angle would have a four height and three base, right?
And what proportion of this line versus this line would you have to have to have those exact angles? And I found that there was a pattern. And the pattern for the smallest pyramid was five height over four base, right? And that created a 51.34 degree angle. I found that Khafre pyramid to have a 53.13 degree angle would have a four height and three base, right?
And what proportion of this line versus this line would you have to have to have those exact angles? And I found that there was a pattern. And the pattern for the smallest pyramid was five height over four base, right? And that created a 51.34 degree angle. I found that Khafre pyramid to have a 53.13 degree angle would have a four height and three base, right?
So wait, there's a pattern there already, isn't there? Five over four, then four over three. And then four over three, also as an inversion, if I take the entire length of the base of that pyramid, it would be six over four. So I invert it and then reduce it down. And six over four is equal to three over two, right? Because you divide them both by two to get the lowest common denominator.
So wait, there's a pattern there already, isn't there? Five over four, then four over three. And then four over three, also as an inversion, if I take the entire length of the base of that pyramid, it would be six over four. So I invert it and then reduce it down. And six over four is equal to three over two, right? Because you divide them both by two to get the lowest common denominator.