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Which ratio is known as the golden ratio?
The Golden Ratio denoted by the Greek letter phi, usually lower case (φ) states that the division of a line segment into two creates a ratio of the shorter part to the longer equal to that of the longer to the whole. This can be solved, using algebra, to give φ = (1 + √5)/2= 1.61803 approx.
What is the Golden Ratio of 6 inches?
The golden ratio, also known as the golden mean, is 1.61803399.Using that factor, the golden ratio of 6 inches would be:6 in. * 1.61803399 = 9.70820394 inches. Rounding produces 9.7 in.
Are the algebra 2 worksheets hard If so, how can we make them easier?
There is no easier method to practice your math skills other than using the algebra 2 worksheets to help. They have good samples to use to baseline your skills.
How can a segment be divided such that the ratio of the whole long piece to the shorter piece is equivalent to the ratio of the whole segment to the long piece?
This can be solved using something called 'The Golden Ratio', when the longer segment is compared to the whole is about 1.618033988... The Golden Ratio is the ONLY ratio capable of this.
Where is the golden ratio used?
It is used in nature all the time. Buds on plant stalks sprout using the Golden Ratio. When architects use the Golden ratio to design a building , the building looks good, and feels good. The Parthenon on the Acropolis in Athens, Greece is such a building. Good artist s often unconciously use the Golden Ratio ; the focus of a painting is never in the centre of the canvas, but at the golden ratio. The ratio is 1: 1.618.... or (phi) = (1 + sqrt(5)) / 2 it is an Irrational number. It also goes by the names , Golden Number, Devine Section, God's Number, etc., Have a look in Wikioedia under 'Golden Ratio'.
How does the golden ratio relate to the Fibonacci sequence?
The golden ratio is approximately 1.618: 1. This ratio is commonly found in nature and architecture. Stock traders often look for this ratio in patterns on stock charts. One way to compute this ratio is to compare any adjacent Fibonacci numbers. For this reason stock traders often refer to this type of analysis using the term Fibonacci, as in "Fibonacci retracements".
What is the fuel ratio on a 1997 kx 500?
32:1 is very safe.The better the 2 stroke oil (Golden Spectro,amsoil) the higher ratio you can run.For example,we run 40:1 on our KX 500 using Golden Spectro..
What is the fuel oil ratio on a 2004 Honda cr250 using golden spectro?
50-1 the best i run it in my 02 cr 250
What are some real life examples of the Golden Ratio?
You read about all the math related aspects of the golden ratio, and now you want to see it applied to real life, right? Well, you already know about various ways the golden ratio appears in real life, and you probably haven't even thought about it at all! ---- One of the first peoples to use the golden ratio in their art, architecture, and other aspects of daily life was the Egyptians. They called the golden ratio the "sacred ratio" and used it in their hieroglyphics and pyramids, as well as other monuments to the dead. ---- The sides of the Egyptian pyramids were golden triangles. Additionally, the three-four-five triangle is a golden ratio between the five unit side and the three unit side. The Egyptians considered this kind of right triangle extremely important and used it also in the pyramids. ---- ---- The Egyptian hieroglyphics also contained many proportions based on the golden ratio. The letter h, for example, is the golden spiral. Additionally, p and sh are created using golden rectangles ---- However, the use and occurance of the Golden Ratio in aesthetics doesn't end with the ancient Egyptians. It was used by the Pythagoreans, Greeks, Romans, and artists during the Renaissance. ---- The frequent appearance of the Golden Ratio in the arts over thousands of years presents us with an interesting question: Do we surround ourselves with the Golden Ratio because we find it aesthetically pleasing, or do we find it aesthetically pleasing because we are surrounded by it?In the 1930's, New York's Pratt Institute laid out rectangular frames of different proportions, and asked several hundred art students to choose which they found most pleasing. The winner? The one with Golden Ratio proportions.
Why is graphing easier than using elimination or substitution?
Graphing is not necessarily easier than elimination or substitution. If you are good at drawing graphs, and do not like algebra, then graphing is easier. However, elimination and substitution are much faster, and graphing can often get awkward when working with more complicated formulae.
Is the ratio of a widescreen closer to a golden rectangle or a normal TV?
The Golden Mean is 1.618, right? "Widescreen" is usually interpreted to mean 16:9, which divides down to 1.78, and "Television ratio" is 4:3, which divides out to 1.3...so a widescreen is closer to the Golden Rectangle. Bonus answer: Laptop computers with 17" displays (usually 1440x900 or 1920x1200 resolution) have nearly exactly the same aspect ratio as the Golden Rectangle -- 1440 divided by 900 is 1.6... which is VERY close, and you can generate a perfect Golden Spiral using the 1440x900 dimensions!
How are Algebra Algebra 1 and Algebra 2 different?
In Algebra 1 you learn all the basics and build on these skills through a certain level. Geometry came in between for everyone I've knows.. here you use the basic algebra skills in an otherwise easier course. Algebra 2 consist of more advanced numbers, equations, operators, rules and procedures, without most of what one learned into Geomretry. You're constantly using the quadratic equation, which was used in geometry andvery often in Algebra 2. You'll solve systems of equations and start to get into trig
