The shape is called the teardrop shape!
In 2-dimensions, its parametric equation is
x = sin(t)*[sin(t/2)]^m
y = cos(t) for -pi < t < pi
The integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. m = 3 is about right.
The 3-d version is obtained by rotating this shape about the y axis.
The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.
You can't tell the dimensions from knowing the volume. The tank could be in the shape of a cube, a long skinny box, a sphere, a teardrop, a cylinder standing up with flat top and bottom, a cylinder lying down with round ends, etc., and every shape would have different dimensions for a volume of 1,000 barrels.
The metric unit is a millilitre. The metric unit is a millilitre. The metric unit is a millilitre. The metric unit is a millilitre.
the shape of an acute is V shape.
It has a definite shape
Sort of a teardrop shape.
A teardrop shape?
a teardrop shape
teardrop.
Yes for instance a dipole will have a doughnut shape field and a directional like a yagie will have a long teardrop shape field at the front end and a shorter teardrop field at the rear and some smaler fields sideways and a parabolic disc wil have a very long teardrop shape field
A sphere, actually a sphere is wrong, its more of a teardrop shape....
A domesticated hedgehog should have a teardrop shape when viewed from both the sides and top.
In its conventional form, of a circular shape with tapering sides, NO.
While each seed can vary, most apple seeds are in the shape of a teardrop.
Long legs, teardrop shape, beady eyes, dish ears, quills over back.
The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.The shape is called the teardrop shape!In 2-dimensions, its parametric equation isx = sin(t)*sinm(t/2)y = cos(t) for -pi < t < piThe integer constant, m, changes the shape of the teardrop. At m = 0 the shape is a circle and as m increases the shape gets a pointier the top. I think 3 is about right.The 3-d version is obtained by rotating this shape about the y axis.
Many formula 1 racing car designers and aircraft designers have found the teardrop to be the most aerodynamic shapethe teardrop or raindrop is indeed the most aerodynamic shape at subsonic speeds.At supersonic speeds the so called "Sears-Haack body" has better aerodynamics.