Conceptually similarSPLPythagorean theorem equationSS2768222SV6690SPLPythagorean theorem equationSS2768224SV6691SPLPythagorean theorem, 16th centurySS2757498SU7119SCIENCE PHOTO LIBRARYPythagorean theorem, illustrationSS21337814SCIENCE SOURCEPythagorean TheoremSS2205079BD8034SCIENCE SOURCEPythagorean Theorem (in Arabic)SS2437410BR9641SCIENCE SOURCEPythagorean Theorem, Arabic and EnglishSS2437423BR9654SCIENCE SOURCEPythagorean Theorem (in Arabic)SS2437425BR9656SCIENCE SOURCEPythagorean Theorem (in English)SS2437426BR9657View AllView more with similar tones Pythagorean theorem equationLicense type:Rights ManagedUnique identifier:SS2742284Legacy Identifier:SV6710Description:Pythagorean theorem, equation. This theorem, named for 6th-century BC Ancient Greek mathematician Pythagoras, states that in a right-angled triangle, the sum of the square of the hypotenuse ("c" squared,the side opposite the right angle) is equal to the sum of the squares of the other two sides ("a" squared and "b" squared). Pythagorean theorem is applied in many everyday uses to calculate distance. For example in engineering, architecture, surveying, forensic analysis of bullet trajectories, sourcing the epicenter of earthquakes and so on.Credit:SPL/Science SourceSize:6215px × 3390px (~60 MB)Get PricingHow Will The Visual Be Used?ShareKeywords:art-C020/1734-C0201734-diagram-equation-formula-geometry-history-hypotenuse-illustration-math-pythagoras theorem-pythagorean theorem-pythagorean triple-ratio-simplest-squared-squares-sum-theorem-triangle-triangular-trigonometryModel release:N/ARestrictions:No Sale through SubagentsParent folder:SPL FTP 140707-11