A small tool to view real-world ActivityPub objects as JSON! Enter a URL
or username from Mastodon or a similar service below, and we'll send a
request with
the right
Accept
header
to the server to view the underlying object.
{
"@context": [
"https://www.w3.org/ns/activitystreams",
"https://poa.st/schemas/litepub-0.1.jsonld",
{
"@language": "en"
}
],
"actor": "https://poa.st/users/StoleMyThundersBalls",
"attachment": [
{
"blurhash": "DkTSUA%MfQ%MfQ~qoffQoffQ",
"height": 264,
"mediaType": "image/png",
"name": "It can be any irrational number as a chain break. The number Phi, is an infinite, rekur-\nsiver chain breakage, the amazingly exclusively on the number 1 is based.",
"type": "Document",
"url": "https://i.poastcdn.org/adfcec936d6ee12e4bb696ebbad938f077d054485021b21ddca785bc3e96b09e.png",
"width": 792
},
{
"blurhash": "dNTSUA~qfQ~q?boffQoffQfQfQfQ?boffQoffQfQfQfQ",
"height": 1129,
"mediaType": "image/png",
"name": "With appropriate consideration of the various powers of Phi, you notice that in the\ntable adjacent values of a column, amazing way, according to the following scheme, again and again,\njust the basic value of Phi to add:",
"type": "Document",
"url": "https://i.poastcdn.org/182c4596a913cdf40695e2925b2a15d783f43a4ed10aab842bf5dd1f186ebbf7.png",
"width": 807
},
{
"blurhash": "dNTSUA~qfQ~q?boffQoffQfQfQfQ?boffQoffQfQfQfQ",
"height": 1155,
"mediaType": "image/png",
"name": "As you can detect, are the Figures of the decimal places in each case very carefully in the ratio of\n2,618034 (or the same value multiplied by 10) what is the square of the Phi corresponds to. That is, on the\nway of the irrational number to a whole number the decimal places with the square of the Golden\naverage grade, which, once again, the ability of this number system to self-organization underlined\nis. The hyperbolic cone as well as the Golden section to claim to universal laws of nature-",
"type": "Document",
"url": "https://i.poastcdn.org/3d0df6a4ce8b147bfb2bbc20aafe316983cdcc93043ce688fba2ee1b14339209.png",
"width": 810
}
],
"attributedTo": "https://poa.st/users/StoleMyThundersBalls",
"cc": [
"https://poa.st/users/StoleMyThundersBalls/followers"
],
"content": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..<br/><br/>>In addition, the factor of 13 the Golden ratio in an eternal cycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (<a href=\"http://www.spirasolaris.ca/sbb4c.html\" rel=\"noopener\">spirasolaris.ca/sbb4c.html</a>), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.<br/><br/>>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is again the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also when you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the Phipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the form of the hyperbolic cone.<br/><br/>More in Pt. 5!",
"contentMap": {
"en": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..<br/><br/>>In addition, the factor of 13 the Golden ratio in an eternal cycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (<a href=\"http://www.spirasolaris.ca/sbb4c.html\" rel=\"noopener\">spirasolaris.ca/sbb4c.html</a>), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.<br/><br/>>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is again the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also when you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the Phipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the form of the hyperbolic cone.<br/><br/>More in Pt. 5!"
},
"content_type": "text/plain",
"context": "https://poa.st/contexts/ff927593-080e-44b1-bb5a-fb8ea64c2b4f",
"conversation": "https://poa.st/contexts/ff927593-080e-44b1-bb5a-fb8ea64c2b4f",
"formerRepresentations": {
"orderedItems": [
{
"actor": "https://poa.st/users/StoleMyThundersBalls",
"attachment": [
{
"blurhash": "DkTSUA%MfQ%MfQ~qoffQoffQ",
"height": 264,
"mediaType": "image/png",
"name": "It can be any irrational number as a chain break. The number Phi, is an infinite, rekur-\nsiver chain breakage, the amazingly exclusively on the number 1 is based.",
"type": "Document",
"url": "https://i.poastcdn.org/adfcec936d6ee12e4bb696ebbad938f077d054485021b21ddca785bc3e96b09e.png",
"width": 792
},
{
"blurhash": "dNTSUA~qfQ~q?boffQoffQfQfQfQ?boffQoffQfQfQfQ",
"height": 1129,
"mediaType": "image/png",
"name": "With appropriate consideration of the various powers of Phi, you notice that in the\ntable adjacent values of a column, amazing way, according to the following scheme, again and again,\njust the basic value of Phi to add:",
"type": "Document",
"url": "https://i.poastcdn.org/182c4596a913cdf40695e2925b2a15d783f43a4ed10aab842bf5dd1f186ebbf7.png",
"width": 807
},
{
"blurhash": "dNTSUA~qfQ~q?boffQoffQfQfQfQ?boffQoffQfQfQfQ",
"height": 1155,
"mediaType": "image/png",
"name": "As you can detect, are the Figures of the decimal places in each case very carefully in the ratio of\n2,618034 (or the same value multiplied by 10) what is the square of the Phi corresponds to. That is, on the\nway of the irrational number to a whole number the decimal places with the square of the Golden\naverage grade, which, once again, the ability of this number system to self-organization underlined\nis. The hyperbolic cone as well as the Golden section to claim to universal laws of nature-",
"type": "Document",
"url": "https://i.poastcdn.org/3d0df6a4ce8b147bfb2bbc20aafe316983cdcc93043ce688fba2ee1b14339209.png",
"width": 810
}
],
"attributedTo": "https://poa.st/users/StoleMyThundersBalls",
"cc": [
"https://poa.st/users/StoleMyThundersBalls/followers"
],
"content": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..<br/><br/>>In addition, the factor of 13 the Golden ratio in an eternal<br/>cycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (<a href=\"http://www.spirasolaris.ca/sbb4c.html\" rel=\"noopener\">spirasolaris.ca/sbb4c.html</a>), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.<br/><br/>>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is<br/>again the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also<br/>when you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the<br/>Phipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the Form<br/>of the hyperbolic cone.<br/><br/>More in Pt. 5!",
"contentMap": {
"en": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..<br/><br/>>In addition, the factor of 13 the Golden ratio in an eternal<br/>cycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (<a href=\"http://www.spirasolaris.ca/sbb4c.html\" rel=\"noopener\">spirasolaris.ca/sbb4c.html</a>), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.<br/><br/>>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is<br/>again the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also<br/>when you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the<br/>Phipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the Form<br/>of the hyperbolic cone.<br/><br/>More in Pt. 5!"
},
"content_type": "text/plain",
"context": "https://poa.st/contexts/ff927593-080e-44b1-bb5a-fb8ea64c2b4f",
"conversation": "https://poa.st/contexts/ff927593-080e-44b1-bb5a-fb8ea64c2b4f",
"inReplyTo": "https://poa.st/objects/cd7f2ccb-a844-4cf0-b510-625a21412faf",
"published": "2024-03-31T16:00:12.731606Z",
"sensitive": false,
"source": {
"content": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..\n\n>In addition, the factor of 13 the Golden ratio in an eternal\ncycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (www.spirasolaris.ca/sbb4c.html), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.\n\n>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is\nagain the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also\nwhen you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the\nPhipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the Form\nof the hyperbolic cone.\n\nMore in Pt. 5!",
"mediaType": "text/plain"
},
"summary": "",
"tag": [
{
"href": "https://poa.st/users/StoleMyThundersBalls",
"name": "@StoleMyThundersBalls",
"type": "Mention"
}
],
"to": [
"https://poa.st/users/StoleMyThundersBalls",
"https://www.w3.org/ns/activitystreams#Public"
],
"type": "Note"
}
],
"totalItems": 1,
"type": "OrderedCollection"
},
"id": "https://poa.st/objects/b2f97cc9-15fc-407e-baf3-6c0615024447",
"inReplyTo": "https://poa.st/objects/cd7f2ccb-a844-4cf0-b510-625a21412faf",
"published": "2024-03-31T16:00:12.731606Z",
"replies": {
"items": [
"https://poa.st/objects/4bde11e7-ef95-47d9-aecf-035d8b0afcec"
],
"type": "Collection"
},
"repliesCount": 1,
"sensitive": false,
"source": {
"content": ">The number Phi comes in Torkado model as the reciprocal of the so-called g-factor (1/0,618034.. = 1,618034..) before. Another Definition of the Golden section: A route is in the ratio of the Golden section, divided, when the shorter part to the longer behaves as the longer portion to the whole track. The number Phi is the only number for which the following applies: 1.618034... = 1/0.618034... = 1.618034...^–1 and 1.618034...^2= 2.618034..\n\n>In addition, the factor of 13 the Golden ratio in an eternal cycle itself generated, such as Fractals, the Mandelbrot set, which recursively in himself again and again to repeat. Interestingly, the orbital periods of the planets in the years of our Sonnensystems according to John N. Harris (www.spirasolaris.ca/sbb4c.html), as well as their average distances from the sun to the 3. Keplerschem law in relation to the powers of Phi, if the rotation time of the earth, the numerical value of 1 (the orbital period of the earth around the sun is one year) is used, which the following table is an abstract Image of the inner harmony of the solar system.\n\n>by Subtracting the values of the Phi-powers to each other, to get back to other Phi-powers, depending on what is the exponent you put it to do. Allocated to non-adjacent Phi-powers, the result is again the corresponding Phi-potencies, depending on the exponent for the Phi-powers of ge-elect has. Multiplied or added to the Phi powers to each other, there is always room for more Phi-Po-tenzen. Due to the property that the various powers of phi, again and again exactly to the value of Phi or other powers of Phi, add, and because the values of two neighboring Phi-power of the table again and again in the ratio of the Golden section to each other and also when you Subtract or Multiply by Phi-powers again and again, Phipotencies result, you now have a perfect System, which has the ability to self-generate. The first mentioned Tongesetz States that the frequency ratio and the length of the strings to each other reciprocal behavior, since the Frequency of a Sound to the reciprocal of the worn-out strings of length that is. Looking at the values of the Phipotencies of table 2, we see that also with each other reciprocal behavior, and if the line with the exponent 0 (Phi^0 = 1) as a mirror axis which is a Corre-chung to the vertebrae with a hyperbolic shape. The space spiral Golden ratio has thus the form of the hyperbolic cone.\n\nMore in Pt. 5!",
"mediaType": "text/plain"
},
"summary": "",
"tag": [
{
"href": "https://poa.st/users/StoleMyThundersBalls",
"name": "@StoleMyThundersBalls",
"type": "Mention"
}
],
"to": [
"https://poa.st/users/StoleMyThundersBalls",
"https://www.w3.org/ns/activitystreams#Public"
],
"type": "Note",
"updated": "2024-03-31T16:02:06.715141Z"
}