hypotenuse in A Sentence

    1

    Right. The Hypotenuse, good one.

    0
    2

    The Hypotenuse of one prism is coated with polarization dielectric coating.

    0
    3

    He didn't call it the Hypotenuse, he called it the shortcut distance.

    0
    4

    The length of the ladder is the Hypotenuse, so c is our unknown.

    0
    5

    Triangle 3 has area c2/2, and it is half of the square on the Hypotenuse.

    0
    6

    Area of a right-angled triangle along the segments dividing the Hypotenuse into an inscribed circle.

    0
    7

    A photon emitted by the object at A(at time) will reach O after traversing the Hypotenuse.

    0
    8

    By the Pythagorean theorem, it follows that the Hypotenuse of this triangle also has length c.

    0
    9

    The vector forms the Hypotenuse of the triangle, so to find its length we use the Pythagorean theorem.

    0
    10

    The side of the triangle opposite the right angle is always the longest side, and it is called the Hypotenuse.

    0
    11

    The 128- foot-[ 39 m] long Hypotenuse of the triangle is parallel to the earth's axis and points toward the North Pole.

    0
    12

    Additionally, light entered into the A-C surface will reflect twice inside the glass substrate before being emitted through the Hypotenuse surface at 60.

    0
    13

    In our example, we know the length of one side and the Hypotenuse(3 & 5), so we would write our equation as 3² + b² = 5.

    0
    14

    By doing this, it's easy to find the length of the a and b sides, then calculate c, the Hypotenuse, which is the distance between the two points.

    0
    15

    If you know the length of side a = 6, and the Hypotenuse c = 10, then you should set the equation up like so: 62 + b2 = 102.

    0
    16

    Non Polarization Beamsplitter Cube( NBPS Cube) consists of a pair of precision high tolerance right angle prisms cemented together with a metallic-dielectric coating on the Hypotenuse of one of the Optical prisms.

    0
    17

    The Pythagorean theorem tells us that the Hypotenuse of the first triangle must be the square root of 2, because each side has a value of 1 and 1 squared is still 1.

    0
    18

    What makes the spiral interesting is that the Hypotenuse of the next triangle is the square root of 3, and the one after that is the square root of 4, and so on.

    0
    19

    A central theorem is the Pythagorean theorem, which states in any right triangle, the square of the length of the Hypotenuse equals the sum of the squares of the lengths of the two other sides.

    0
    20

    The fact is that in this case you will need to recall the school curriculum when you studied the Pythagorean theorem about the square of the Hypotenuse, which is equal to two squares of the legs.

    0
    21

    He did this by demonstrating that if the Hypotenuse of an isosceles right triangle was indeed commensurable with a leg, then one of those lengths measured in that unit of measure must be both odd and even, which is impossible.

    0
    22

    Right triangles obey the Pythagorean theorem: the sum of the squares of the lengths of the two legs is equal to the square of the length of the Hypotenuse: a2 b2 c2, where a and b are the lengths of the legs and c is the length of the Hypotenuse.

    0
    23

    In a right triangle with acute angles measuring 30 and 60 degrees, the Hypotenuse is twice the length of the shorter side, and the longer side is equal to the length of the shorter side times √3: c 2 a{\displaystyle c=2a\,} b a × 3.{\displaystyle b=a\times {\sqrt{3}}.} For all triangles, angles and sides are related by the law of cosines and law of sines also called the cosine rule and sine rule.

    0