The spheres are similar as their radius will be in the ratio
A sphere is symmetrical, round in shape. It is a three dimensional solid, that has all its surface points at equal distances from the center. It has surface area and volume based on its radius. It does not have any faces, corners or edges.
The Surface Area of a Sphere = 4πr²
The Volume of a Sphere = ( 4/3 ) πr³
where r is the radius of the sphere
Given data ,
Let the first sphere be represented as A
Now , the radius of the sphere A = r₁
Let the first sphere be represented as B
Now , the radius of the sphere B = r₂
And , the volume of sphere A , V₁ = ( 4/3 ) πr₁³
The volume of sphere B , V₂ = ( 4/3 ) πr₂³
The ratio of V₁ / V₂ is given by
V₁ / V₂ = ( 4/3 ) πr₁³ / ( 4/3 ) πr₂³
On simplifying , we get
V₁ / V₂ = r₁³ / r₂³
So , the spheres are similar by their ratio of radius
Hence , all the spheres are similar in ratios
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Answer:
True
Step-by-step explanation:
The measure of the interior angle x as shown in the triangle below is 48°
A triangle is a polygon with three sides and three angles. Types of triangles are obtuse, scalene, isosceles and equilateral. The sum of all angles in a triangle is 180 degrees.
From the diagram:
y + 52 + 59 = 180° (sum of angles in a straight line)
y = 69°
x + y + 63 = 180° (sum of angles in a triangle)
x + 69 + 63 = 180
x = 48°
The measure of the interior angle x as shown in the triangle below is 48°
Find out more on Triangle at: brainly.com/question/23945265