The process when an egg and a sperm cell come together is called fertilization.
True
Following the cell division of a eukaryotic cell, the two daughter cells end up with the incorrect number of chromosomes. One of the daughter cells has too many chromosomes and the other does not have enough chromosomes. During which phase of mitosis did this error likely occur?
What is anaphase?
DNA replication takes place just prior to this phase of Meiosis.
What is Meiosis 1?
Meiosis deals with these types of cells.
What are gametes?
Meiosis 1 ends in 2 haploid cells.
False. Meiosis 1 ends in 2 diploid cells.
The stage of meiosis where crossing over occurs.
What is prophase 1?
The creation of diploid cells.
What is Meiosis 1?
The stage pictured is... https://www.thoughtco.com/thmb/ktpFgHpJ8pmD2sa5xIXWO5Z0jso=/1250x0/filters:no_upscale():max_bytes(150000):strip_icc():format(webp)/Meiosis-Metaphase-II-58dc0bed5f9b584683327f24.jpg
What is metaphase 2?
This process in meiosis ensures more genetic variation.
What is Crossing over and Independent assortment?
The relaxed, and uncoiled form of DNA is called a chromatin.
True
During which phase of cell division do tetrads form?
What is prophase 1?
The stage of meiosis where the chromosomes are reduced in number.
What is Meiosis 2?
The picture her shows.. https://www.quia.com/files/quia/users/lmcgee/genetics/meiosis_stages/tetrad.jpg
What is a tetrad?
At the end of the two divisions of Meiosis, how many haploid cells are formed?
What is 4 haploid cells?
Meiosis is a process in which identical cells are produced.
False. Meiosis gives rise to four unique daughter cells.
What stage does this describe?
-Spindle fibers contract and separate sister chromatids
-Chromatids (now called chromosomes) move to opposite poles
what is anaphase 2?
Sister chromatids pulled to opposite poles.
What is Meiosis 2?
The procees occuring in this image is... 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
What is crossing over?
If a haploid cell for a female honey bee has 32 Chromosomes, how many chromosomes are in a diploid honey bee cell?
64
During metaphase of mitosis, sister chromatids line up along the equator (middle) of the cell and during metaphase I of meiosis, tetrads line up at the equator.
True.
The stage where independent assortment happens.
What is metaphase 1?
Crossing over occurs.
What is Meiosis 1?
This occurs in Prophase 1 but does not occur in prophase 2.
https://www.knowswhy.com/wp-content/uploads/2017/08/Difference-between-Prophase-1-and-2.gif
What is genetic recombination?
Put these in the correct order
1) Cytokinesis
2) Chromosomes align
3) DNA is copied
4) Spindle fibers form
DNA is copied, spindle fibers form, chromosomes align, cytokinesis