No, only their positions will change.
To rotate a figure 90 degrees clockwise around the origin on a coordinate grid, you can use the transformation rule: (x, y) becomes (y, -x). For the point (5, 5), applying this rule results in (5, -5). Therefore, after a 90-degree clockwise rotation, the new coordinates of the point are (5, -5).
270 degrees is 3/4 of the way around the circle. Ir is the same as rotating it 90 degrees (1/4) of the way clockwise. Turn it so anything that was pointing straight up would be pointing to the right.
To rotate a point or figure 90 degrees clockwise about the origin, you can use the transformation formula: for a point (x, y), the new coordinates after rotation will be (y, -x). Apply this transformation to each vertex of the figure. After calculating the new coordinates for all points, plot them to visualize the rotated figure.
To rotate an object 90 degrees counter-clockwise, you can visualize or use a coordinate system. If you have a point (x, y), the new coordinates after the rotation will be (-y, x). For more complex shapes, apply this transformation to each point of the shape. Alternatively, if you're working with a physical object, simply turn it left (counter-clockwise) until it is oriented 90 degrees from its original position.
rotate it 90 degrees
You dont, its just 90 degrees 3 times..
No, only their positions will change.
To rotate a figure 90 degrees clockwise around the origin on a coordinate grid, you can use the transformation rule: (x, y) becomes (y, -x). For the point (5, 5), applying this rule results in (5, -5). Therefore, after a 90-degree clockwise rotation, the new coordinates of the point are (5, -5).
Switch the x and y coordinates and multiply the first first coordinate (the new x coordinate) by -1
To rotate a figure 90 degrees clockwise about the origin, simply swap the x and y coordinates of each point and then negate the new y-coordinate. This is equivalent to reflecting the figure over the line y = x and then over the y-axis.
270 degrees is 3/4 of the way around the circle. Ir is the same as rotating it 90 degrees (1/4) of the way clockwise. Turn it so anything that was pointing straight up would be pointing to the right.
I dont really know if this is right but i think to do this problem you have to take a point then rotate the paper counter clockwise around the origin then you have a new point which is called a prime. Then reflect it over the y axis on the graph.
To rotate an object 90 degrees counter-clockwise, you can visualize or use a coordinate system. If you have a point (x, y), the new coordinates after the rotation will be (-y, x). For more complex shapes, apply this transformation to each point of the shape. Alternatively, if you're working with a physical object, simply turn it left (counter-clockwise) until it is oriented 90 degrees from its original position.
Rotating a figure 270 degrees is like rotating the figure to the left 90 degrees. I am not sure what formula or rule you use. *Joe Jonas Rocks*
ENE plus 90 degrees (clockwise) is SSE.
You have to switch the x and y coordinates and multiply your new x coordinate by -1. You can also dram the point and rotate your paper physically by 90 degrees. Example: Your Coordinates: (3,8) New Coordinates: (-8,3) (3,8) ---> (8,3) ---> (-8,3) Another Ex: (-7,-1) --> (-1,-7) --> (1,-7)