Right Triangle in a sentence
Synonym: triangle.
Meaning: A triangle with one angle measuring 90 degrees; a fundamental shape in geometry.
(1) A right triangle has three sides.
(2) The cathetus is a side of a right triangle.
(3) The angle of a right triangle is 90 degrees.
(4) The two angles in a right triangle are equal.
(5) In a right triangle, one angle is always acute.
(6) The vertical angle is found in a right triangle.
(7) The angles in a right triangle are complementary.
(8) The angle of a right triangle is always 90 degrees.
(9) A right triangle can be found in a lot of buildings.
(10) A right triangle has one angle that is a right angle.
Right Triangle sentence
(11) The hypotenuse is the longest side of a right triangle.
(12) The angle within a right triangle is always 90 degrees.
(13) The angles are complementary and form a right triangle.
(14) The cathetus is one of the two legs of a right triangle.
(15) Arcsines are used to find the angle of a right triangle.
(16) A right triangle has one angle that measures 90 degrees.
(17) Arccosines are used to find the angle of a right triangle.
(18) The shape of a right triangle looks like a slice of pizza.
(19) The two sides of a right triangle are not equal in length.
(20) A right triangle cannot be classified as an acute triangle.
Right Triangle make sentence
(21) The quadrates of a right triangle are always perpendicular.
(22) The central angle of a right triangle is always 90 degrees.
(23) The interior angle of a right triangle measures 90 degrees.
(24) The hypotenuse of a right triangle is the longest diagonal.
(25) The interior angle of a right triangle is always 90 degrees.
(26) Bisect before you find the hypotenuse of the right triangle.
(27) A right triangle can be used to measure the height of a dam.
(28) A right triangle can be used to measure the height of a tree.
(29) A right triangle can be used to measure the length of a road.
(30) A right triangle can be used to measure the length of a pier.
Sentence of right triangle
(31) The vertical angle of the right triangle measures 45 degrees.
(32) Complementary angles are opposite angles in a right triangle.
(33) The longest side of a right triangle is called the hypotenuse.
(34) A right triangle can be used to measure the length of a river.
(35) A right triangle can be used to measure the length of a fence.
(36) A right triangle can be used to measure the height of a tower.
(37) A right triangle can be used to measure the length of a canal.
(38) The acute angle of the right triangle is less than 90 degrees.
(39) The hypotenuse is opposite the right angle in a right triangle.
(40) A right triangle can be used to measure the length of a bridge.
Right Triangle meaningful sentence
(41) A right triangle can be used to measure the height of a statue.
(42) A right triangle can be used to measure the length of a runway.
(43) The diagonal of a square is the hypotenuse of a right triangle.
(44) The hypotenuse of a right triangle is opposite the right angle.
(45) The cathetus is opposite to the acute angle in a right triangle.
(46) The cathetus is adjacent to the right angle in a right triangle.
(47) Arcsines are used to find the missing angle in a right triangle.
(48) A right triangle can be used to measure the length of a highway.
(49) A subset of the shape triangle is the shape of a right triangle.
(50) A right triangle has one angle that measures exactly 90 degrees.
Right Triangle sentence examples
(51) The hypotenuse is also known as the diagonal of a right triangle.
(52) A right triangle can be used to measure the height of a mountain.
(53) A right triangle can be used to measure the height of a building.
(54) A right triangle can be used to measure the height of a flagpole.
(55) A right triangle can be used to measure the height of a windmill.
(56) The two sides of a right triangle are not always equal in length.
(57) A right triangle can be used to measure the length of a riverbank.
(58) A right triangle can be used to measure the length of a bike path.
(59) The midpoints of a line segment and its base form a right triangle.
(60) A right triangle can be used to measure the height of a skyscraper.
Sentence with right triangle
(61) A right triangle can be used to measure the height of a lighthouse.
(62) The term 'hypotenuse' denotes the longest side of a right triangle.
(63) The bisectrices of a right triangle are perpendicular to each other.
(64) The cosines of acute angles in a right triangle are always positive.
(65) The cathetus is perpendicular to the hypotenuse in a right triangle.
(66) The math problem required me to draw a figure with a right triangle.
(67) A right triangle can be used to measure the length of a train track.
(68) A right triangle can be used to measure the height of a water tower.
(69) The bisectors of the angles in a right triangle are also the medians.
(70) A right triangle can be used to measure the length of a hiking trail.
Use right triangle in a sentence
(71) The arctangent function is used to find the angle in a right triangle.
(72) The professor asked us to calculate the angle out of a right triangle.
(73) The two sides of a right triangle can be equal or not equal in length.
(74) The hypotenuse is always opposite the right angle in a right triangle.
(75) Cosec is used to find the length of the hypotenuse in a right triangle.
(76) A right triangle can be used to measure the height of a roller coaster.
(77) The brachydiagonals of a right triangle are perpendicular to each other.
(78) I need to use the arcsin function to find the angle of a right triangle.
(79) I need to use the arctan function to find the angle of a right triangle.
(80) Trigonometries are based on the ratios of the sides of a right triangle.
Sentence using right triangle
(81) A right triangle can be used to measure the distance between two points.
(82) The sum of the measures of the angles in a right triangle is 90 degrees.
(83) Even though a right triangle can be isosceles, it cannot be equilateral.
(84) The circumcircle of a right triangle has its diameter as the hypotenuse.
(85) The midpoints of a line segment and its hypotenuse form a right triangle.
(86) The cathetus is the side adjacent to the right angle in a right triangle.
(87) The hypotenuse is the side that connects the two legs of a right triangle.
(88) The project requires you to cube along the hypotenuse of a right triangle.
(89) Cosec can be used to find the length of the hypotenuse in a right triangle.
(90) The longest side in a triangle is called the hypotenuse in a right triangle.
Right Triangle example sentence
(91) The hypotenuse is always longer than either of the legs in a right triangle.
(92) The medians of a right triangle divide it into three smaller right triangles.
(93) I had to bisect over the hypotenuse of the right triangle to find its midpoint.
(94) The hypotenuse is always longer than either of the two legs of a right triangle.
(95) The bisectors of the angles in a right triangle are perpendicular to each other.
(96) Vertical angles are formed by two intersecting lines that form a right triangle.
(97) An obtuse angle can be found in a right triangle if one of the angles is obtuse.
(98) The hypotenuse is always the side opposite the largest angle in a right triangle.
(99) The sines of angles in a right triangle can be used to find missing side lengths.
(100) The hypotenuse of a right triangle is the longest side, opposite the right angle.
Sentence with word right triangle
(101) The professor demonstrated how to bisect past the hypotenuse of a right triangle.
(102) The bisector of a right triangle's hypotenuse forms two congruent right triangles.
(103) The included angle between the two sides of a right triangle is always 90 degrees.
(104) The Pythagorean theorem can be used to determine if a triangle is a right triangle.
(105) The hypotenuse is the side that is opposite to the right angle in a right triangle.
(106) The hypotenuse is the side that is not next to the right angle in a right triangle.
(107) The equation x squared plus y squared equals z squared represents a right triangle.
(108) The tangent function in trigonometry is used to find the angle of a right triangle.
(109) The hypotenuse is the side that is not touching the right angle in a right triangle.
(110) Arctan is used to find the angle of a right triangle given the lengths of its sides.
Sentence of right triangle
(111) The Pythagorean theorem is used to find the length of the sides of a right triangle.
(112) The hypotenuse is the side that is farthest from the right angle in a right triangle.
(113) Pythagorean theorem is used to calculate the length of a right triangle's hypotenuse.
(114) Trigonometrically, we can determine the length of the hypotenuse of a right triangle.
(115) The cathetus is used to calculate the sine and cosine of an angle in a right triangle.
(116) The hypotenuse is the side that is neither the base nor the height of a right triangle.
(117) The hypotenuse is the side that is not adjacent to the right angle in a right triangle.
(118) Arctangents are mathematical functions used to calculate the angle of a right triangle.
(119) The Pythagorean theorem can be used to find the length of any side in a right triangle.
(120) The hypotenuse of a right triangle is the longest side and is opposite the right angle.
Right Triangle used in a sentence
(121) The cosecant of an acute angle in a right triangle is always greater than or equal to 1.
(122) The hypotenuse is the side that is not connected to the right angle in a right triangle.
(123) A right circular cone can be formed by rotating a right triangle around one of its legs.
(124) The Pythagorean theorem can be used to find the length of the sides of a right triangle.
(125) Pythagoras' theorem can be used to find the length of the hypotenuse in a right triangle.
(126) Cosec is defined as the ratio of the hypotenuse to the opposite side in a right triangle.
(127) The Pythagorean theorem is used to find the length of the hypotenuse in a right triangle.
(128) The included angle between the two sides of the right triangle was found to be 90 degrees.
(129) The hypotenuse is the side that is furthest away from the right angle in a right triangle.
(130) The Pythagorean theorem is based on the relationship between the sides of a right triangle.
Right Triangle sentence in English
(131) The hypotenuse is the side that is not in contact with the right angle in a right triangle.
(132) The hypotenuse is the side that is not adjacent to the two other sides in a right triangle.
(133) The cosines of the angles in a right triangle can be used to find the lengths of the sides.
(134) The hypotenuse is the side that is directly across from the right angle in a right triangle.
(135) The cosecant function is used to calculate the length of the hypotenuse in a right triangle.
(136) The cotangent of an angle can be used to calculate the length of a side in a right triangle.
(137) The isosceles triangle can be used to find the length of the hypotenuse of a right triangle.
(138) If a right triangle has two equal side lengths, then it must also have two congruent angles.
(139) The Pythagorean theorem can be used to find the length of a missing side in a right triangle.
(140) The hypotenuse is the side that is not similar to the base or the height in a right triangle.
(141) The Pythagorean theorem is used to determine the length of the hypotenuse in a right triangle.
(142) ACOS is an important function in trigonometry that helps calculate angles in a right triangle.
(143) The hypotenuse is the side that is diagonally opposite to the right angle in a right triangle.
(144) The hypotenuse is the side that is not parallel to the base or the height in a right triangle.
(145) The hypotenuse is the side that is not the same as the base or the height in a right triangle.
(146) The Pythagorean theorem can be applied to any right triangle, regardless of its size or shape.
(147) The angle between the hypotenuse and one of the legs of a right triangle is always 90 degrees.
(148) The hypotenuse is the side that is not congruent to the base or the height in a right triangle.
(149) The hypotenuse is the side that is not identical to the base or the height in a right triangle.
(150) The cosine of an angle is the ratio of the adjacent side to the hypotenuse in a right triangle.
(151) Although a right triangle has one angle measuring 90 degrees, it can have varying side lengths.
(152) The hypotenuse is the side that is not equivalent to the base or the height in a right triangle.
(153) The sines of the angles in a right triangle can be found using the opposite side and hypotenuse.
(154) The arctangent of the hypotenuse divided by the adjacent side gives the angle in a right triangle.
(155) The arctangent of the opposite side divided by the hypotenuse gives the angle in a right triangle.
(156) When solving for the missing side length of a right triangle, the Pythagorean theorem can be used.
(157) The hypotenuse is the side that is not perpendicular to the base or the height in a right triangle.
(158) The secant of an angle is equal to the hypotenuse divided by the adjacent side in a right triangle.
(159) The cosine of an angle is equal to the adjacent side divided by the hypotenuse in a right triangle.
(160) Cosine is a trigonometric function, and it is used to find the length of a side of a right triangle.
(161) Although the hypotenuse is the longest side of a right triangle, it is not always easy to calculate.
(162) The hypotenuse is the side that is not equal in length to the base or the height in a right triangle.
(163) The arctangent of the opposite side divided by the adjacent side gives the angle in a right triangle.
(164) The cosecant of an angle is equal to the hypotenuse divided by the opposite side in a right triangle.
(165) The sum of the lengths of the two sides of a right triangle is equal to the length of the hypotenuse.
(166) The cosine of an angle can be calculated using the adjacent and hypotenuse sides of a right triangle.
(167) Because the hypotenuse is opposite the right angle in a right triangle, it is always the longest side.
(168) The tangent of an angle is equal to the opposite side divided by the adjacent side in a right triangle.
(169) The tangent of an angle is equal to the opposite side of a right triangle divided by the adjacent side.
(170) The Pythagorean theorem can be used to find the length of the third side of an isosceles right triangle.
(171) The vertical angle of the right triangle is opposite the hypotenuse, and the other two angles are acute.
(172) The cosecant of an angle is equal to the ratio of the hypotenuse to the opposite side in a right triangle.
(173) The tangent of an angle is used in trigonometry to solve for missing sides and angles in a right triangle.
(174) Although a right triangle can be found in many real-life situations, it is most commonly used in geometry.
(175) Trigonometrically speaking, the cosine function is used to calculate the adjacent side of a right triangle.
(176) Pythagoras is credited with discovering the mathematical relationship between the sides of a right triangle.
(177) The tangent of an angle is equal to the ratio of the opposite side to the adjacent side of a right triangle.
(178) The cosine function is used to calculate the ratio of the adjacent side to the hypotenuse in a right triangle.
(179) If you are given the hypotenuse and one leg of a right triangle, you can use trigonometry to find the other leg.
(180) The Pythagorean theorem is a key concept in understanding the relationship between the sides of a right triangle.
(181) If a right triangle has one acute angle measuring 30 degrees, then the other acute angle must measure 60 degrees.
(182) The arcsin function is used to find the angle in a right triangle when the opposite side and hypotenuse are known.
(183) Because a right triangle's angles always add up to 180 degrees, the sum of the acute angles must equal 90 degrees.
(184) The value of cotan can be calculated using the ratio of the adjacent side to the opposite side of a right triangle.
(185) The Pythagorean theorem is a fundamental concept in Euclidean geometry that relates to the sides of a right triangle.
(186) Although the hypotenuse is always opposite the right angle, the other two angles in a right triangle can vary in size.
(187) If you know the length of the two legs of a right triangle, you can use the Pythagorean theorem to find the hypotenuse.
(188) Because a right triangle's hypotenuse is always the longest side, it can be used to find the length of the other sides.
(189) The length of the hypotenuse in a right triangle equals the square root of the sum of the squares of the other two sides.
(190) The trigonometric function, cosines, helps calculate the ratio of the adjacent side to the hypotenuse in a right triangle.
(191) If you are trying to find the length of the hypotenuse in a right triangle, you will need to know the lengths of both legs.
(192) The isosceles right triangle has two equal legs, and its hypotenuse is the square root of two times the length of its legs.
(193) If you are trying to find the area of a right triangle, you will need to know the length of the hypotenuse and one of the legs.
(194) The Pythagorean theorem is a fundamental concept that helps us understand the relationship between the sides of a right triangle.
(195) If a right triangle has one leg measuring 5 units and the hypotenuse measuring 13 units, then the other leg must measure 12 units.
(196) The quadrantal theorem states that the sum of the squares of the sides of a right triangle is equal to the square of the hypotenuse.
(197) The Pythagorean theorem is a fundamental concept in geometry that relates to the relationship between the sides of a right triangle.
(198) The Pythagorean theorem can be used to find the length of any side of a right triangle if the lengths of the other two sides are known.
(199) The cosecant of an angle is equal to the length of the hypotenuse divided by the length of the side opposite the angle in a right triangle.
(200) If you are trying to find the perimeter of a right triangle, you will need to know the length of all three sides, including the hypotenuse.
(201) Even though a right triangle can be classified as a special type of triangle, it still follows the same rules and formulas as other triangles.
(202) If you are given the hypotenuse and one of the acute angles in a right triangle, you can use trigonometry to find the length of the other leg.
(203) The Pythagorean theorem states that in a right triangle, the square of the hypotenuse is equal to the sum of the squares of the other two sides.
(204) If you want to find the length of the hypotenuse of a right triangle, you need to use the Pythagorean theorem, which involves the square root of two.
(205) If you know the length of two sides of a right triangle, you can use the cosine function to find the length of the third side and the measure of the angles.
(206) If you are given the hypotenuse and the length of one of the legs in a right triangle, you can use the Pythagorean theorem to find the length of the other leg.
(207) If you are given the length of two sides of a right triangle and the measure of the included angle, you can use the law of cosines to find the length of the third side.
(208) If you are given the length of the hypotenuse and one of the other sides of a right triangle, you can use the Pythagorean theorem to find the length of the remaining side.
(209) If you know the length of two sides of a right triangle, you can use trigonometry to find the measure of the third angle, which is incredibly useful in real-world applications.
(210) The cosine rule, also known as the law of cosines, is used to find the length of a side or the measure of an angle in a non-right triangle, and it involves the cosine function.
(211) The Pythagorean theorem states that in a right triangle, the square of the hypotenuse is equal to the sum of the squares of the other two sides, and this concept is fundamental to geometry.
(212) The Pythagorean theorem states that the sum of the squares of the two shorter sides of a right triangle is equal to the square of the hypotenuse, which involves finding the square root of a number.
(213) The theorem states that for any right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other two sides, and this fundamental relationship has countless applications in fields ranging from engineering to physics.
Right Triangle meaning
A right triangle is a fundamental geometric shape that plays a significant role in various mathematical and real-world applications. It is a type of triangle that has one angle measuring 90 degrees, also known as a right angle. In this article, we will explore tips on how to use the term "right triangle" effectively in sentences.
1. Definition and Introduction: When introducing the term "right triangle" in a sentence, it is essential to provide a clear definition.
For example, "A right triangle is a triangle that contains a 90-degree angle." This initial explanation helps establish the context for further discussion.
2. Mathematical Context: To demonstrate a deeper understanding of the concept, you can incorporate mathematical context into your sentence. For instance, "The Pythagorean theorem is a fundamental principle used to solve problems involving right triangles." This showcases the relevance of right triangles in mathematical calculations.
3. Real-World Examples: To make the term more relatable, incorporating real-world examples can be helpful. For instance, "The roof of a house often forms a right triangle, allowing builders to utilize the Pythagorean theorem to determine the length of the diagonal." This example illustrates how right triangles are encountered in everyday situations.
4. Properties and Characteristics: Highlighting the properties and characteristics of right triangles can enhance your sentence.
For example, "Right triangles have two sides perpendicular to each other, known as the legs, and a hypotenuse, which is the side opposite the right angle." This description provides a concise overview of the essential features of a right triangle.
5. Relationship with Other Shapes: Exploring the relationship between right triangles and other geometric shapes can add depth to your sentence. For instance, "A right triangle is a special case of a triangle, as it possesses unique properties not found in other types of triangles." This emphasizes the distinctiveness of right triangles within the broader realm of geometry.
6. Trigonometric Functions: Incorporating trigonometric functions associated with right triangles can further enrich your sentence.
For example, "The sine, cosine, and tangent functions are commonly used to calculate the ratios of the sides in a right triangle." This demonstrates the practical applications of right triangles in trigonometry.
7. Problem-Solving Scenarios: To showcase the practicality of right triangles, you can present problem-solving scenarios. For instance, "To determine the height of a tree, one can use a right triangle formed by the tree, its shadow, and the sun's rays." This highlights how right triangles can be utilized to solve real-world problems.
8. Historical Significance: If relevant, you can mention the historical significance of right triangles in your sentence.
For example, "The concept of right triangles dates back to ancient civilizations, with the Egyptians and Babylonians utilizing their properties for surveying and construction purposes." This adds an interesting historical context to your sentence.
9. Educational Applications: Discussing the educational applications of right triangles can be beneficial. For instance, "Right triangles are extensively taught in geometry courses as they serve as a foundation for understanding trigonometry and other advanced mathematical concepts." This emphasizes the importance of comprehending right triangles in the field of education.
10. Conclusion: Conclude your sentence by summarizing the significance of right triangles.
For example, "Right triangles are a fundamental geometric shape that finds applications in various fields, from mathematics and engineering to architecture and navigation." This final statement reinforces the versatility and relevance of right triangles in different disciplines. Incorporating these tips into your sentences will help you effectively use the term "right triangle" while providing a comprehensive understanding of its properties, applications, and significance.
The word usage examples above have been gathered from various sources to reflect current and historical usage of the word Right Triangle. They do not represent the opinions of TranslateEN.com.