Skip to main content
Home
MATHalino
Engineering Mathematics
  • Home
    • Tweets
    • Blogs
    • Quiz
    • Forums
    • Recent
    • Glossary
    • Popular
  • Algebra
    • Plane Trigonometry
    • Spherical Trigonometry
    • Plane Geometry
    • Solid Geometry
    • Analytic Geometry
    • Engineering Economy
    • Derivation of Formulas
    • General Engineering
  • Differential Calculus
    • Integral Calculus
    • Differential Equations
    • Advance Engineering Mathematics
  • Engineering Mechanics
    • Strength of Materials
    • Theory of Structures
  • Reviewers
    • Surveying
    • Hydraulics
    • Timber Design
    • Reinforced Concrete Design
    • Geotechnical Engineering
    • CE Ref
      • MSTE
      • HGE
      • SEC
  • Courses
 
Log in/Register
 
 
Home

Maxima minima

Francis June E. Seraspe's picture

Minima maxima: a²y = x⁴

Submitted by Francis June E.... on April 8, 2020 - 2:34pm

How to solve a²y = x⁴

  • Read more about Minima maxima: a²y = x⁴
  • 6 comments
  • Log in or register to post comments
  • 699 reads
 
 

New forum topics

  • Physics: Uniform Motion
  • Rescue at Sea
  • Using two pumps
  • Emptying a Tank
  • Speed of a Plane
  • Range of an Airplane
  • Chemistry: Sugar Molecules
  • Moving Walkways
  • Physics: Uniform Motion
  • Lightning and Thunder
More
Subscribe to RSS - Maxima minima
 

Recent Updates

  • MATHalino Now Offers Online Courses
  • Maximum stresses on a pole subjected to combined loadings
  • Equivalent land area of 600 mm^2 map-area with given map-scale
  • Support reactions of a symmetrically-loaded three-hinged arch structure
  • Evaluate the integral of (x dx) / (x^2 + 2) with lower limit of 0 and upper limit of 1
  • Determine the radius of curvature of the curve x = y^3 at point (1, 1)
  • Calculate the area enclosed by the curve x^2 + y^2 - 10x + 4y - 196 = 0.
  • Sum of the first ten terms of a Geometric Progression
  • Calculation of true distance of a line measuring 160.42 m using a tape that is 0.02m too long
  • A circle has an equation of x^2 + y^2 + 2cy = 0. Find the value of c when the length of the tangent from (5, 4) to the circle is equal to one.

Follow @iMATHalino

 

 

MATHalino
Home • Forums • Blogs • Glossary • Recent
About • Contact us • Terms of Use • Privacy Policy • Hosted by Linode • Powered by Drupal
MATHalino - Engineering Mathematics • Copyright 2020 © Jhun Vert • All rights reserved
  • Facebook icon
  • Twitter icon
  • Instagram icon
  • Youtube (Channel) icon
  • RSS icon
  • Contact icon
View Stat Details