Wolfram|Alpha WidgetsOverviewTourGallerySign In

Search results for "horizon"

Center of mass for a hemisphere and weight

Added Dec 6, 2020 in Engineering

Disclaimer: this might be totally wrong. For a given hemisphere rigidly attached to a cup return to vertical from horizontal. >--D is it tipped over v | ◡ (does it come back up?)

Perímetro triángulo tijeral horizontal

Added Jul 27, 2017 by auf in Engineering

galpon


Surface of revolution

Added Feb 28, 2017 by WillWebber in Mathematics

This generates a surface of revolution between two chosen x values around the stated axis. For some reason it does not like horizontal axes other than the x-axis.

Size of a black hole frm event horizon radius

Added Sep 25, 2016 by Proud_Death_Entertainment in Astronomy

Copy-cat widget for press


black hole size per solar mass

Added May 27, 2016 by Chiefy in Astronomy

Returns black hole event horizon radius by mass.

Vertical and Horizontal Asymptotes

Added May 12, 2016 by MooreMathMadness in Mathematics

Find the vertical and horizontal asymptotes for rational functions.


Parabola Horizontal

Added Nov 19, 2015 by MarcoTec087 in Mathematics

Proyecto Tercer Parcial

Parabola Horizontal

Added Nov 20, 2015 by Aldidiurits in Mathematics

Paloma Avelar Treviño A01632053 Aldo Rubén Aguirre Covarrubias A01229515 Erika Nayeli Gutiérrez Molina A01229492 Esteban Gonzalez Solache A01632074


Hipérbola

Added Nov 17, 2015 by Andres2899 in Mathematics

Este widget te ayuda a realizar una hipérbola, ya sea horizontal o vertical.

Volume of Revolution

Added Oct 25, 2015 by JohnStenger in Mathematics

revolve a region between two curves about a horizontal line


G12.I.1 M/{d[M,TCD]+d[M,TCN]}min (bt27)

Added Aug 18, 2015 by coth123 in Mathematics

Tìm điểm M trên đường cong (C){d[M,TCD]+d[M,TCN]} đạt min (bt27). To find the point M on the curve (C) {d[M,TCD]+d[M,TCN]} min .TCD : vertical asymptote ; TCN : horizontal asymptote cohtran MMPC-VN

G12.I.1 TIM M : (C) d[M,TCD]=kd[M,TCN] (bt25)

Added Aug 17, 2015 by coth123 in Mathematics

Tìm điểm M trên đường cong (C) sao cho d[M,TCD]=kd[M,TCN] (bt25). To find the point M on the curve (C) y=f(x) : d[M,TCD]=kd[M,TCN]. TCD : vertical asymptote ; TCN : horizontal asymptote cohtran MMPC-VN


12 of 41|Load More »
 
 
Sign Up for Wolfram|Alpha News

 
 
Thank You

We appreciate your interest in Wolfram|Alpha and will be in touch soon.

—The Wolfram|Alpha Team