1.Which solid has two bases that are triangles and three lateral surfaces that are rectangles?
-Triangular Pyramid*
-Rectangular Prism
-Triangular Prism
-Rectangular Pyramid
2. A solid with at most one base cannot be which of the following?
-cone
-cube
-pyramid
-sphere*
3.Which of the following are considered skew lines?
-AB and AE*
-AB and CE
-BC and CE
-BC and DE
Please check these few answers Thanks :)<3
Yes, your answers are correct.
Which sold does the net form?
-Hexagonal Prism
-Hexagonal Pyramid*
-Rectangular Prism
-Rectangular Pyramid
Please check this :)<3
8. What is the surface of the given figure?
-2,520 cm^2
-2,792 cm^2
-4,080cm^2
-2,280cm^2*
Check Please :)<3333
No Answer 🤷♀️💀
BTW YA'LL NEED TO STOP LOOKIN AT BC YA'LL GONNA FAIL WITH MY AWNSERS 😭🤚
1. To determine which solid has two bases that are triangles and three lateral surfaces that are rectangles, we can analyze the options provided:
a) Triangular Pyramid: This solid has a triangular base and three triangular lateral surfaces, so it does not fit the description.
b) Rectangular Prism: This solid has two rectangular bases and four rectangular lateral surfaces, so it does not fit the description.
c) Triangular Prism: This solid has two triangular bases and three rectangular lateral surfaces, which matches the given description.
d) Rectangular Pyramid: This solid has a rectangular base and four triangular lateral surfaces, so it does not fit the description.
Therefore, the correct answer is c) Triangular Prism.
2. To determine which solid with at most one base cannot be, we analyze the options provided:
a) Cone: A cone has only one circular base, so it can fit the given condition.
b) Cube: A cube has six square faces, so it does not fit the condition.
c) Pyramid: A pyramid can have a polygonal base but also has triangular lateral faces, so it does not fit the condition.
d) Sphere: A sphere has no faces or bases, so it does not have any base, and it fits the given condition.
Therefore, the correct answer is d) sphere.
3. To determine which lines are considered skew lines, we analyze the options provided:
a) AB and AE: Skew lines are lines that do not intersect and are not parallel. Without further information about the position or orientation of the lines, we cannot determine if AB and AE are skew lines.
b) AB and CE: Without further information about the position or orientation of the lines, we cannot determine if AB and CE are skew lines.
c) BC and CE: Without further information about the position or orientation of the lines, we cannot determine if BC and CE are skew lines.
d) BC and DE: Skew lines are lines that do not intersect and are not parallel. Without further information about the position or orientation of the lines, we cannot determine if BC and DE are skew lines.
Therefore, the correct answer is a) AB and AE, as they are the only option listed that could potentially be skew lines, given the lack of additional information.
Note: Further information, such as the lines' equations, positioning, or direction, would be needed to definitively determine if lines are skew or not.