What was probably the last slightly realistic hope to prevent Iran from acquiring nuclear weapons without the need to go to war to prevent it ended in failure at the talks in Baghdad. The negotiations failed even as it was discovered that Iran had enriched Uranium to at least 27%. The previous stated limit was 20%. On the matrix below the axis term is URANIUM. Near it is ENRICHED at skip +1. IRAN is at the same skip as URANIUM. THE EVIL CONGREGATION is in the open text above IRAN. NETANYAHU, the Israeli Prime Minister who must now decide if it’s time to attack Iran, is at skip +1. I just looked to see if ISRAEL was on the matrix. It was, as part of the phrase WE OURSELVES WILL BE ARMED READY TO GO BEFORE THE CHILDREN OF ISRAEL. I took the full phrase as a hint that the USA, which crosses URANIUM at skip -2, will be forced to lead the attack against Iran before Israel does its thing.
STATISTICAL SIGNIFICANCE OF THE MATRIX. As per my standard protocol, no statistical significance is assigned to the axis term, here URANIUM at its 28th lowest skip. By far, the most significant term found was the preferred 5-letter spelling of IRAN at the same skip as URANIUM. Before downgrading significance due to the ELS rank of the axis term, odds against it appearing at a special case skip (+/- 1 or the absolute skip of the axis term) were about 112 to 1. The word ENRICHED was found at skip +1 against odds of about 64 to 1. THE EVIL CONGREGATION and the full phrase WE OURSELVES WILL BE ARMED READY TO GO BEFORE THE CHILDREN OF ISRAEL were both found in the open text, but only in an a-posteriori fashion. Therefore they were not part of the calculation, however ISRAEL at skip +1 was sought a-priori and it was there against odds of about 1.4 to 1 (Israel occurs 591 times in Torah, so it is rarely statistically significant). NETANYAHU was found at skip +1 against odds of about 28 to 1. WAR was located in the open text against odds of nearly 13 to 1. USA was not statistically significant. After downgrading combined odds by a factor of 28 to account for ELS rank 28 of the axis term, the matrix exists against odds of about 128,446 to 1. It is thus highly significant.