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To dilate the point ( c(93) ) by a scale factor of 3 using the origin as the center of dilation, you multiply the coordinates of the point by 3. If ( c(93) ) refers to the point ( (9, 3) ), the transformed coordinates would be ( (9 \times 3, 3 \times 3) = (27, 9) ). Therefore, the transformed point after the dilation is ( c(27, 9) ).
To dilate a shape by a factor of 3, multiply the coordinates of each vertex of the shape by 3. For example, if a vertex is at (x, y), after dilation it will be at (3x, 3y). This process enlarges the shape while maintaining its proportions and the center of dilation, which is typically the origin (0,0) unless specified otherwise.
To find the coordinates of point A after being dilated by a factor of 3, you multiply the original coordinates (x, y) of point A by 3. For example, if point A has coordinates (2, 4), the new coordinates after dilation would be (2 * 3, 4 * 3) or (6, 12). Thus, the coordinates of point A after dilation depend on its original position.
moving the decimal 3 place to the right 1000 have 3 zeros.
To graph a dilation, first identify the center of dilation and the scale factor. For each point of the original figure, measure the distance from that point to the center of dilation, then multiply that distance by the scale factor to find the new distance from the center. Plot the new points at these distances, and connect them to form the dilated figure. Ensure that the orientation remains the same and that the shape is proportional to the original.
To dilate the point ( c(93) ) by a scale factor of 3 using the origin as the center of dilation, you multiply the coordinates of the point by 3. If ( c(93) ) refers to the point ( (9, 3) ), the transformed coordinates would be ( (9 \times 3, 3 \times 3) = (27, 9) ). Therefore, the transformed point after the dilation is ( c(27, 9) ).
To dilate a shape by a factor of 3, multiply the coordinates of each vertex of the shape by 3. For example, if a vertex is at (x, y), after dilation it will be at (3x, 3y). This process enlarges the shape while maintaining its proportions and the center of dilation, which is typically the origin (0,0) unless specified otherwise.
The 1st is a right angle triangle and the 2nd is a scalene triangle.
To find the coordinates of point A after being dilated by a factor of 3, you multiply the original coordinates (x, y) of point A by 3. For example, if point A has coordinates (2, 4), the new coordinates after dilation would be (2 * 3, 4 * 3) or (6, 12). Thus, the coordinates of point A after dilation depend on its original position.
moving the decimal 3 place to the right 1000 have 3 zeros.
To find the transformation of the point C(9, 3) when dilated with a scale factor of ⅓ from the center of dilation (3, 6), you first subtract the center coordinates from C's coordinates: (9 - 3, 3 - 6) = (6, -3). Then multiply by the scale factor of ⅓: (6 * ⅓, -3 * ⅓) = (2, -1). Finally, add the center coordinates back: (2 + 3, -1 + 6) = (5, 5). Thus, the transformed point is (5, 5).
It depends on the nature of the problem. If, for example, the problem is to calculate 2+3, then the centre of dilation will have no effect whatsoever!
Oh, dude, you can totally multiply 3 by 12 to get 36. It's like basic math, right? You just gotta find the number that when you multiply it by 3, gives you 36. Easy peasy lemon squeezy!
You multiply the one digit number on the bottom to every number on the top starting at the right and so on with every other number on the bottom.
2x3x3x5 90
Well, first just multiply till you get the right answer. The answer is 3.4!
dilation stage, expulsion stage, placental stage