7.2 batches may be made with 9 cup of flowers
This snow flake-like figure can be generated by rotating an end 60° five times around the center of the hexagon. There are two forms: (i) clockwise, (ii) counterclockwise.
<h3>What is the angle of rotation of a snow flake?</h3>
Geometrically speaking, snow flakes represent <em>regular</em> hexagons. <em>Regular</em> hexagons can divided into six concentric <em>regular</em> triangles, whose <em>central</em> angles have a measure of 60°. This <em>fractal</em> figure can be generated by rotating 60° five times around the center.
To learn more on angles of rotation: brainly.com/question/21136643
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3W = 384 is the equation and W = 32
Answer:
g(1) = -6
Step-by-step explanation:
g(x) = -2x^2 - 4x
You want to solve for g(1). To do this make every x value in the original equation become 1.
g(1) = -2(1)^2 - 4(1)
Evaluate the exponent.
g(1) = -2(1) - 4(1)
Multiply.
g(1) = -2 - 4
Subtract.
g(1) = -6