Give the order of the element in the factor group a) 7 + <3> in Z15...

Determine the order of the indicated element in the indicated quotient group. Justify your answers. a)...

Determine the order of the indicated element in the indicated quotient group. Justify your answers. a) 3+ <4> in Z12/<4> b) 2 + <12> in Z15/<12>

a) Give an example of a group of order 360 that contains no subgroups of order...

a) Give an example of a group of order 360 that contains no subgroups of order 180, and explain why b) Let G be a group of order 360, Does G have an element of order 5? please explain

Is it possible for a group G to contain a non-identity element of finite order and...

Is it possible for a group G to contain a non-identity element of finite order and also an element of infinite order? If yes, illustrate with an example. If no, give a convincing explanation for why it is not possible.

Give an example of a nontrivial subgroup of a multiplicative group R× = {x ∈ R|x...

Give an example of a nontrivial subgroup of a multiplicative group R× = {x ∈ R|x ̸= 0} (1) of finite order (2) of infinite order Can R× contain an element of order 7?

True or False: An infinite group must have an element of infinite order. I know that...

True or False: An infinite group must have an element of infinite order. I know that the answer is false. Please give a detailed explanation. Will gives thumbs up ASAP.

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products...

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products of an element of order 2 with an element of order 5 and show that they give primitive elements modulo 11.

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products...

(a) Give the order of each element of {1,2,3,...,10} modulo 11. (b) Find all possible products of an element of order 2 with an element of order 5 and show that they give primitive elements modulo 11.

Find the order of every element in the group Z2 time Z3.

Find the order of every element in the group Z2 time Z3.

Can there be an element of infinite order in a finite group? Prove or disprove.

Can there be an element of infinite order in a finite group? Prove or disprove.

Show that in a free group, any nonidentity element is of infinite order

Show that in a free group, any nonidentity element is of infinite order