When discussing angles in geometry, one fundamental concept to understand is the notion of antonyms of acute angles. An acute angle is defined as an angle that measures less than 90 degrees. Therefore, the antonyms of acute angles are angles that measure 90 degrees or more.
Right angles are the most common example of antonyms of acute angles. A right angle measures exactly 90 degrees and forms a perfect L shape. This type of angle is crucial in geometry and is often used as a reference point in various geometric constructions and calculations.
Obtuse angles are another example of antonyms of acute angles. An obtuse angle is defined as an angle that measures more than 90 degrees but less than 180 degrees. These angles appear wider and more open than acute angles, providing a contrast in geometric properties and applications.
Example Sentences With Opposite of Acute Angle
Antonym | Sentence with Acute Angle | Sentence with Antonym |
---|---|---|
Obtuse | An acute angle measures less than 90 degrees. | An obtuse angle measures more than 90 degrees. |
Blunt | The corner of the table formed an acute angle. | The corner of the table formed a blunt angle. |
Wide | The acute angle between the two walls was sharp. | The wide angle between the two walls was gentle. |
Round | The building had pointed rooftops creating acute angles. | The building had dome-shaped rooftops avoiding round angles. |
Dull | The acute angle formed by the two lines was sharp. | The dull angle formed by the two lines was gentle. |
Open | The V-shape formed by the lines is an acute angle. | The V-shape formed by the lines is an open angle. |
Straight | The two lines intersected to form an acute angle. | The two lines were parallel with no straight angle between them. |
Soft | The pointed roof had an acute angle at its peak. | The rounded roof had a soft angle at its peak. |
Slow | The clock’s minute hand formed an acute angle with the hour hand. | The clock’s hands moved together to avoid creating a slow angle. |
Blurry | The image was crisp at all acute angles of observation. | The image appeared fuzzy when viewed at blurry angles. |
Built | The acute angle formed by the two walls was precise. | The built angle formed by the two walls was curved. |
Fast | The car took a sharp turn creating an acute angle. | The car smoothly turned without forming a fast angle. |
Small | The triangle had three acute angles. | The triangle did not have any small angles. |
Shallow | The acute angle between the two roads was sharp. | The shallow angle formed by the two roads was gentle. |
Bulky | The piece of furniture had acute angles on all edges. | The piece of furniture had smooth edges avoiding bulky angles. |
Even | The fence posts were placed at acute angles to each other. | The fence posts were aligned to form even angles with each other. |
Immobile | The acute angle between the two intersecting lines was sharp. | The lines were steady and did not form any immobile angles. |
Misty | The view of the landscape at the acute angle was clear. | The view was obscured and unclear at the misty angles. |
Bent | The ruler had markings for measuring acute angles. | The ruler did not have markings for measuring bent angles. |
Gentle | The dog turned its head at an acute angle to see. | The dog turned with a gentle angle and softly gazed outward. |
Jerky | The dancer’s movements were smooth and fluid, without any acute angles. | The dancer’s performance was characterized by jerky angles. |
Curved | The spider created a web between acute angles of the branches. | The spider avoided areas with curved angles for web construction. |
Big | The square had four acute angles of sharp measurement. | The square did not have any big angles at its corners. |
Bright | The sun’s light created sharp acute angles as it shone through the window. | The room was dimly lit with no bright angles visible. |
Jagged | The mountain range had peaks with acute angles. | The mountain range had slopes without any jagged angles. |
Overlapping | The Venn diagram had sections with acute angles of separation. | The Venn diagram did not have any overlapping angles. |
Odd | The octagon had eight acute angles at the corners. | The shape did not have any odd angles that were out of place. |
Overcast | The sky was clear, and the buildings cast sharp acute angles on the ground. | The skies were gray and obscured, without any overcast angles visible. |
Flexible | The ruler had markings for acute angles and precise measurement. | The ruler lacked markings for flexible angles and adaptable lengths. |
Square | The kite had a structure with acute angles at its sides. | The shape did not resemble a square angle at any point. |
Firm | The wall had sharp edges with acute angles. | The pillow had soft edges without any firm angles. |
Loud | The flag flapped in the wind creating sharp acute angles. | The flag waved gently, causing no loud angles. |
Wild | The river took a sharp turn to create an acute angle. | The river meandered gently, avoiding any wild angles. |
Lenient | The teacher graded the test strictly, noting the acute angles. | The teacher was forgiving, not concerned with lenient angles in the test. |
Smooth | The jigsaw puzzle pieces fit together with acute angles. | The puzzle pieces did not connect properly, showing smooth angles. |
Opaque | The glass window allowed light through forming acute angles inside. | The window was tinted and blocked light, avoiding any opaque angles. |
Sharpened | The arrowhead had perfectly acute angles for piercing. | The arrowhead was rounded, lacking any sharpened angles. |
Crowded | The dishes were stacked at acute angles in the cupboard. | The dishes were arranged neatly without any crowded angles. |
Clear | The mirror reflected light at acute angles into the room. | The mirror did not reflect light, leaving the room without any clear angles. |
More Example Sentences With Antonyms Of Acute Angle
Antonym | Sentence with Acute Angle | Sentence with Antonym |
---|---|---|
Obtuse Angle | The acute angle measured 45 degrees. | The angle is obtuse and measured 135 degrees. |
Right Angle | An acute angle is less than 90 degrees. | A right angle is exactly 90 degrees. |
Straight Angle | The acute angle is less than a straight line. | The line forms a straight angle at 180 degrees. |
Reflex Angle | An acute angle is smaller than 180 degrees. | The angle is a reflex one, measuring 220 degrees. |
Wide Angle | The acute angle is narrow and acute. | The angle is open and has a wide angle. |
Blunt Angle | The angle is not blunt, it is acute. | This is a blunt angle with a measure of 150 degrees. |
Dull Angle | The acute angle is sharp and acute. | The angle is rather dull, measuring 120 degrees. |
Straight Line | The line is not straight, it forms an acute angle. | The straight line reaches from point A to point B. |
Right Triangle | An acute angle is in a right triangle, but less than 90 degrees. | A right triangle has a right angle of 90 degrees. |
Constructive Angle | An acute angle contributes to constructive interference. | A destructive angle causes destructive interference. |
Major Arc | The minor arc subtends an acute angle. | The major arc subtends an obtuse angle. |
Shallow Angle | The beam hits the surface at an acute angle. | To maximize reflection, hit the surface at a shallow angle. |
Slanted Angle | The line forms an acute angle with the vertical. | The line is vertical, not slanted like the other one. |
Enclosed Angle | The two lines meet forming an acute angle. | The lines form an enclosed angle of 140 degrees. |
Split Angle | The acute angle is smaller than a right angle. | This is a split angle, dividing the shape into equal halves. |
Open Angle | The arms of the angle are not spread, it is acute. | The arms of the angle are wide creating an open angle. |
Interior Angle | The angle is not an interior angle, it is acute. | This triangle has one interior angle smaller than the other. |
External Angle | An acute angle does not extend beyond 90 degrees. | This is an external angle exceeding 90 degrees. |
Nonagon | The hexagon has an acute angle at each corner. | Each corner of the nonagon measures 140 degrees. |
270 degrees | The angle measures less than 270 degrees. | The angle is exactly 270 degrees, forming a straight angle. |
120 degrees | Here, the acute angle does not measure 120 degrees. | The angle measures exactly 120 degrees. |
45 degrees | The angle cannot be both acute and 45 degrees. | The angle measures only 45 degrees. |
160 degrees | The angle is obviously less than 160 degrees. | The angle measures an exact 160 degrees. |
Slanting Line | The angle is formed where the lines are not slanting. | This is an angle formed by a slanting line. |
Built-in Angle | The room corner is not a built-in angle, it is acute. | The built-in angle is where the two walls meet. |
Flat Angle | The acute angle is not flat, it is pointed. | Look for the flat angle where the two walls meet. |
Narrow Angle | The angle is not narrow, it is acute. | The alley makes a sharp curve forming a narrow angle. |
Two Right Angles | The corner is sharp and does not have two right angles. | The corner is square with two right angles. |
Less Than 90 degrees | The angle is not less than 90 degrees, it is acute. | The angle measures less than 90 degrees, not acute. |
Oversized Angle | The angle is small, not oversized. | This oversized angle is too big for the shape. |
Concave Angle | The space between the walls is not concave, it’s acute. | The mirror has a concave angle giving a distorted reflection. |
Outro
Antonyms of acute angle, opposite of acute angle and acute angle ka opposite word are the same thing. In contrast to acute angles, obtuse angles measure between 90 and 180 degrees. The larger measurement of obtuse angles creates a wider opening, making them easier to identify visually. Understanding the distinction between acute and obtuse angles is fundamental in geometry and helps us solve various mathematical problems. By recognizing these differences, we can accurately classify and work with angles in different contexts.
Obtuse angles are crucial in various fields such as architecture, engineering, and design. They play a significant role in creating structures with specific angles and dimensions. By acknowledging obtuse angles’ properties and relationships, professionals can effectively plan and construct various projects. This comprehension enhances precision and efficiency in their work, ensuring the integrity of the final outcome.
In everyday life, recognizing obtuse angles helps us navigate directions, measure spaces, and understand the environment around us. Whether determining the layout of a room or interpreting maps, knowledge of obtuse angles contributes to our spatial awareness. By incorporating this understanding into our daily interactions, we can perceive and appreciate the world from a geometric perspective.