The highlight on the globe is due to the position of the observer. If the observer lowered to the same position as the light, the highlight would be centered. Draw a picture of the camera, globe, and flashlight (with the camera being over the flashlight).
Have you ever used a sundial? The position is not changed once you set it up. If you live in an area with daylight savings time, you have to account for that or else the sundial will appear an hour off. If you live in an area with no time changes through the year, your sundial will be accurate to within 15 minutes all year long.
Let's do some math. There are 360° in a circle or clock face. There are 24 hours per day. This is 15° to represent one hour. If the shadow cast is 15 min early, or 15 min late at max, this would be 3.75° of error. Like I said that is a very small angle. It would not be a 7.5° (30 min) error because you are measuring the angle between true time and the shadow cast, which does not exceed 15 min.
The light source has been placed above Georgia. This is not possible on any Earth Model. Not even flat Earth. Which is how you should know that this is controlled opposition.
Buckle up Buttercup. Because you're about to go on a ride.
Ya that could throw of the y-axis (north/south) of the shadow, but the x-axis (east/west) would be unaffected.
Anyway, forget the sundial thing. Just focus on local aparent noon, that is when the sun is highest in the sky at your given longitude on earth. If the globe earth is on a 23.4° tilt, then the spring and fall equinox would cast shadows at noon in radically different directions. The winter and summer solstice would both cast shadows directly north (or south depending on latitude), though the length of the shadow would be different. Just play around with a globe and a light source and think about that, the geometry seem very clear to me.
I've watched that series, very entertaining heavy stuff!
I clearly can not 'ignore' the sun dial and it's position in relation to the light source, when it is the entire premise your thread and arguments are based on. Ignore the sun dial, look at t he shadows? Makes no sense.
As I've said before in my other reply. Don't pay attention to the sun, look to the stars.
Watched that entire 5 hour video you did? Did that happen in the last 2 hours since I posted it?
the geometry seem very clear to me.
Such an unfounded and meaningless statement. Allow me such hollow parlance in return.
The righteousness of being good is very apparent to me.
The highlight on the globe is due to the position of the observer. If the observer lowered to the same position as the light, the highlight would be centered. Draw a picture of the camera, globe, and flashlight (with the camera being over the flashlight).
Have you ever used a sundial? The position is not changed once you set it up. If you live in an area with daylight savings time, you have to account for that or else the sundial will appear an hour off. If you live in an area with no time changes through the year, your sundial will be accurate to within 15 minutes all year long.
Let's do some math. There are 360° in a circle or clock face. There are 24 hours per day. This is 15° to represent one hour. If the shadow cast is 15 min early, or 15 min late at max, this would be 3.75° of error. Like I said that is a very small angle. It would not be a 7.5° (30 min) error because you are measuring the angle between true time and the shadow cast, which does not exceed 15 min.
The light source has been placed above Georgia. This is not possible on any Earth Model. Not even flat Earth. Which is how you should know that this is controlled opposition.
Buckle up Buttercup. Because you're about to go on a ride.
https://www.bitchute.com/video/QetnEQ2pszMr/
Ya that could throw of the y-axis (north/south) of the shadow, but the x-axis (east/west) would be unaffected.
Anyway, forget the sundial thing. Just focus on local aparent noon, that is when the sun is highest in the sky at your given longitude on earth. If the globe earth is on a 23.4° tilt, then the spring and fall equinox would cast shadows at noon in radically different directions. The winter and summer solstice would both cast shadows directly north (or south depending on latitude), though the length of the shadow would be different. Just play around with a globe and a light source and think about that, the geometry seem very clear to me.
I've watched that series, very entertaining heavy stuff!
I clearly can not 'ignore' the sun dial and it's position in relation to the light source, when it is the entire premise your thread and arguments are based on. Ignore the sun dial, look at t he shadows? Makes no sense.
As I've said before in my other reply. Don't pay attention to the sun, look to the stars.
Watched that entire 5 hour video you did? Did that happen in the last 2 hours since I posted it?
Such an unfounded and meaningless statement. Allow me such hollow parlance in return.
Meaningless.
I watched that video months ago, I've known about that guy for a while.
I think you didn't even read my last comment, I was trying to simplify things since you had a problem with these pictures.
So how does a sundial work on a flat earth?