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Which polynomial identity will prove that 117 = 125 − 8?

Which polynomial identity will prove that 117 = 125 − 8?

What polynomial identity should be used to prove that 19 = 27 − 8?

Define the terms out-group homogeneity and derogation. What questions will you ask to figure out whether or not this is happening? The communication hypothesis is then established. What kinds of questions would you ask to see if the touch hypothesis holds true? As a consultant, how would you suggest building more trust between groups?
is looking at Miguel is considering taking a supplement that claims to help him develop muscle faster and with less workouts. Which of the following statements best describes Miguel’s peers’ negative impact on him?

What polynomial identity should be used to prove that 252 = (20 + 5)2

Pythagorean triples are named after the Pythagorean theorem, which states that any right triangle has side lengths that satisfy the formula a2 + b2 = c2; hence, Pythagorean triples define a right triangle’s three integer side lengths. Correct triangles with non-integer sides, on the other hand, do not form Pythagorean triples. For example, a right triangle has sides a = b = 1 and c = 2, however (1, 1, 2) is not a Pythagorean triple since 2 is not an integer. Furthermore, since 2 is irrational, 1 and 2 do not have an integer common multiple.
Since ancient times, Pythagorean triples have been identified. Plimpton 322, a Babylonian clay tablet written in a sexagesimal number system from around 1800 BC, is the oldest known record. Edgar James Banks discovered it shortly after 1900 and sold it to George Arthur Plimpton for $10 in 1922. [two]
Scatter plot of the first Pythagorean triples’ legs (a, b) with a and b less than 6000. To show the parabolic patterns, negative values are included. The “rays” arise from the assumption that if (a, b, c) is a Pythagorean trio, then (2a, 2b, 2c), (3a, 3b, 3c), and, more broadly, (ka, kb, kc) for any positive integer k are as well.

What polynomial has roots of −5, −4, and 1?

It’s worth noting that the fractions don’t need to be in their simplest form: 4/22/2 1/3 6 To each fraction, add two: 7/3 88/2 6/2 7/3 88/2 6/2 7/3 88/2 6/2 To make all numbers whole, multiply them together. 241612 (phone) Two sides of a Pythagorean triangle are: 241612 (phone)
Add the squares of these two numbers to get the third:
72+242 = 49 + 576= 625 162+122 = 256 + 144= 400… and find the hypotenuse by taking the square root: To get the Pythagorean triangle, multiply 625 by 25 and 400 by 20. 7:24:25:16:12:20:7:24:25:16
2 and produces a Pythagorean triangle every time: Begin by obtaining: 2 4/2 6 8 10 2 4/2 6 8 10 2 4/2 6 8 10 2 4/2 6 8 10 2 4/2 6 8 10 2 4/2 6 8 8/2 4 5 12 13 1/22/4 8/2 4 5 12 13 31st of March 26th of March 9th of March 12th of March 15th of March 2/3 3 8 15 17 2/3 3 8 15 17 2/3 3 8 15 17 2 12 16 20 4/42/21 24/28/4 12 16 20 6 7 24 25 / 3 20 21 29 3/2 4/3 20/2 4/3 20/2 4/3 20/2 4/3 20/2 a quarter 8 9 40 41
For example: 3 4 5 Starting with a, b, and h, goUpto: a – 2b + 2h, 2a – b + 2h, 2a – 2b + 3h, 2a – 2b + 3h, 2a – 2b + 3h, 2a – 2b + 3h, 2a – 2b + 3h 5 + 12 + 13 goAlongto: a + 2b + 2h, 2a + b + 2h, 2a + 2b + 3h, 2a + 2b + 3h, 2a + 2b + 3h, 2a + 2b + 3h, 2a + 2b + 3h, 2 20-21-20-29 goDownto:–a + 2b + 2h, –2a + b + 2h, –2a + 2b + 3h, –2a + 2b + 3h, –2a + 2b + 3h, –2a + 2b + 3h, –2a + 2b + 15:08:17
every primitive Pythagorean triangle with the shortest leg the longest leg: both legs: an or b a and b hypotenuse: h either side: an or b or h all sides: a & b & h perimeter: a+b+h area: ab/2 inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 sides inradius=excess/2 a commodity oh, the difference in legs () hypothyroidism and leg length discrepancy ()