Brazil
136,149,409
138,956,419
141,704,603
144,389,785
147,011,107
Population, total | Data | Table - 1 views
-
-
China 1,051,040,000 1,066,790,000 1,084,035,000 1,101,630,000 1,118,650,000
-
United Kingdom 56,550,269 56,681,397 56,802,051 56,928,327 57,076,712
- ...2 more annotations...
My Country choices - 2 views
-
-
I like that you chose these countries because you think that to host the Olympics you probably have to be very large and have a huge population, but after looking at your data, I saw that it wasn't necessarily the case. From looking at the residuals, though, exponential curves didn't work very well.
-
Population, total | Data | Table - 0 views
-
Brazil 161,691,994 164,156,558 166,649,884 169,161,808 171,675,320
-
China 1,204,855,000 1,217,550,000 1,230,075,000 1,241,935,000 1,252,735,000
-
Greece 10,634,000 10,709,000 10,777,000 10,835,000 10,883,000
- ...1 more annotation...
Population, total | Data | Table - 0 views
-
Brazil
-
186,074,634 188,158,438 190,119,995 191,971,506 193,733,795
-
China
- ...5 more annotations...
Population, total | Data | Table - 0 views
-
Brazil 121,618,369 124,494,015 127,418,317 130,360,696 133,281,186
-
China 981,235,000 993,885,000 1,008,630,000 1,023,310,000 1,036,825,000
-
Greece 9,643,000 9,729,000 9,790,000 9,847,000 9,896,00
- ...2 more annotations...
Population, total | Data | Table - 0 views
-
Brazil 149,570,485 152,060,232 154,484,742 156,873,491 159,266,485
-
China
-
1,135,185,000 1,150,780,000 1,164,970,000 1,178,440,000 1,191,835,000
- ...2 more annotations...
Population, total | Data | Table - 0 views
-
Brazil 174,174,447 176,659,138 179,123,364 181,537,359 183,863,524
-
China 1,262,645,000 1,271,850,000 1,280,400,000 1,288,400,000 1,296,075,000
-
Greece 10,917,500 10,949,950 10,987,550 11,023,550 11,061,750
- ...1 more annotation...
Exponential Growth | Khan Academy - 1 views
united Kingdom - Google Maps - 0 views
St. Louis Gateway Arch - EnchantedLearning.com - 0 views
-
A catenary is the shape that a chain or necklace forms when held by the two ends. The Dutch mathematician Christiaan Huygens named this curve from the Latin word catenarius, which means "related to a chain." The equation for a
-
catenary curve is: y = k cosh(x/k) , where cosh is the hyperbolic cosine [cosh(x) = (ex + e-x)/2] and k is the y-intercept (where the curve hits the y-axis).
1 - 14 of 14
Showing 20▼ items per page