graphing parabolas
繪製拋物線
drawing parabolas
繪製拋物線
parabolas equation
拋物線方程
parabolas properties
拋物線性質
parabolas focus
拋物線焦點
parabolas vertex
拋物線頂點
parabolas symmetry
拋物線對稱性
parabolas graph
拋物線圖形
parabolas intersection
拋物線交點
parabolas applications
拋物線應用
parabolas are often used to model the trajectory of projectiles.
拋物線通常用於模擬拋射物的軌跡。
in mathematics, parabolas are defined as the set of points equidistant from a point and a line.
在數學中,拋物線被定義爲與一個點和一條線等距的點的集合。
we can find the vertex of parabolas using the formula.
我們可以使用公式找到拋物線的頂點。
parabolas can open upwards or downwards depending on their equation.
拋物線可以向上或向下開,具體取決於它們的方程。
the reflection property of parabolas is useful in designing satellite dishes.
拋物線的反射特性在設計衛星天線時非常有用。
graphing parabolas helps students understand quadratic functions better.
繪製拋物線幫助學生更好地理解二次函數。
parabolas can intersect the x-axis at zero, one, or two points.
拋物線可以在零、一個或兩個點與x軸相交。
many real-world objects, like bridges, can be modeled by parabolas.
許多現實世界的物體,如橋樑,可以用拋物線建模。
understanding the properties of parabolas is essential for solving quadratic equations.
理解拋物線的性質對於解二次方程至關重要。
parabolas are a key concept in algebra and calculus courses.
拋物線是代數和微積分課程中的一個關鍵概念。
graphing parabolas
繪製拋物線
drawing parabolas
繪製拋物線
parabolas equation
拋物線方程
parabolas properties
拋物線性質
parabolas focus
拋物線焦點
parabolas vertex
拋物線頂點
parabolas symmetry
拋物線對稱性
parabolas graph
拋物線圖形
parabolas intersection
拋物線交點
parabolas applications
拋物線應用
parabolas are often used to model the trajectory of projectiles.
拋物線通常用於模擬拋射物的軌跡。
in mathematics, parabolas are defined as the set of points equidistant from a point and a line.
在數學中,拋物線被定義爲與一個點和一條線等距的點的集合。
we can find the vertex of parabolas using the formula.
我們可以使用公式找到拋物線的頂點。
parabolas can open upwards or downwards depending on their equation.
拋物線可以向上或向下開,具體取決於它們的方程。
the reflection property of parabolas is useful in designing satellite dishes.
拋物線的反射特性在設計衛星天線時非常有用。
graphing parabolas helps students understand quadratic functions better.
繪製拋物線幫助學生更好地理解二次函數。
parabolas can intersect the x-axis at zero, one, or two points.
拋物線可以在零、一個或兩個點與x軸相交。
many real-world objects, like bridges, can be modeled by parabolas.
許多現實世界的物體,如橋樑,可以用拋物線建模。
understanding the properties of parabolas is essential for solving quadratic equations.
理解拋物線的性質對於解二次方程至關重要。
parabolas are a key concept in algebra and calculus courses.
拋物線是代數和微積分課程中的一個關鍵概念。
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