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A. Tell whether the sentence is true or false. Justify your answer. 1. { 1, 2 } { 1, 2, 3 } 5. { n, e, t} { t, e, a, n } 2. 0 is a subset of { 0 } 6. 5 { n | n is a factor of 20 } 3. {1, 2, 3 } { 1, 2, 4} 7. 11 { n | n is a whole number } 4. { a, u } {a, e, i, o, u} 8. 7 { n | n is an odd number g
jerardkelvinoboza
B. Consider the following sets. Answer the questions that follow. Justify your answers. A = { 1, 2, 4, 6, 12 } E = { x | x is an even number } V = {a, i, e, o, u } O = { y | y is an odd number } B = { n | n is a factor of 12} D = {odd numbers less than 10} C = { 1, 3, 5, 7, 9 } G = { z | z is a vowel } N = { n| n is a whole number}
jerardkelvinoboza
1. Which sets are equal? 2. Which sets are equivalent? 3. Which set(s) is/are subsets of another set in the list? Use a Venn diagram to illustrate each relationship. C. If X = { a, b, c, d, e, f, g }; 1. write two subsets of A that satisfy the given condition: a. Contain one element c. Contain three elements b. Contain two elements d. Contain four elements 2. How many one element subsets can be formed? 3. How many two elements subsets can be formed?
jerardkelvinoboza
D. Let us explore! 1. Write all the subsets of a. A = { a } b. B = { a, b } 2. We saw that C = { a, b, c } has 8 subsets. Investigate the number of subsets of a set of n elements. Line up the subsets A, B and C, one line below another, with the same subsets below each other. Study how the subsets of a set of two elements can be obtained from those of a set of one element; how the subsets of a set of three elements can be obtained from those of a set with two elements.
jerardkelvinoboza
A. Tell whether the sentence is true or false. Justify your answer. 1. { 1, 2 } { 1, 2, 3 } 5. { n, e, t} { t, e, a, n } 2. 0 is a subset of { 0 } 6. 5 { n | n is a factor of 20 } 3. {1, 2, 3 } { 1, 2, 4} 7. 11 { n | n is a whole number } 4. { a, u } {a, e, i, o, u} 8. 7 { n | n is an odd number g
jerardkelvinoboza
B. Consider the following sets. Answer the questions that follow. Justify your answers. A = { 1, 2, 4, 6, 12 } E = { x | x is an even number } V = {a, i, e, o, u } O = { y | y is an odd number } B = { n | n is a factor of 12} D = {odd numbers less than 10} C = { 1, 3, 5, 7, 9 } G = { z | z is a vowel } N = { n| n is a whole number} 1. Which sets are equal? 2. Which sets are equivalent? 3. Which set(s) is/are subsets of another set in the list? Use a Venn diagram to illustrate each relationship.
jerardkelvinoboza
C. If X = { a, b, c, d, e, f, g }; 1. write two subsets of A that satisfy the given condition: a. Contain one element c. Contain three elements b. Contain two elements d. Contain four elements 2. How many one element subsets can be formed? 3. How many two elements subsets can be formed?
jerardkelvinoboza
D. Let us explore! 1. Write all the subsets of a. A = { a } b. B = { a, b } 2. We saw that C = { a, b, c } has 8 subsets. Investigate the number of subsets of a set of n elements. Line up the subsets A, B and C, one line below another, with the same subsets below each other. Study how the subsets of a set of two elements can be obtained from those of a set of one element; how the subsets of a set of three elements can be obtained from those of a set with two elements.
Answers & Comments
Answer:
link lang ho yan:)
Step-by-step explanation:
wala hong sasgutan dyn
1. { 1, 2 } { 1, 2, 3 } 5. { n, e, t} { t, e, a, n }
2. 0 is a subset of { 0 } 6. 5 { n | n is a factor of 20 }
3. {1, 2, 3 } { 1, 2, 4} 7. 11 { n | n is a whole number }
4. { a, u } {a, e, i, o, u} 8. 7 { n | n is an odd number g
Justify your answers.
A = { 1, 2, 4, 6, 12 } E = { x | x is an even number }
V = {a, i, e, o, u } O = { y | y is an odd number }
B = { n | n is a factor of 12} D = {odd numbers less than 10}
C = { 1, 3, 5, 7, 9 } G = { z | z is a vowel }
N = { n| n is a whole number}
2. Which sets are equivalent?
3. Which set(s) is/are subsets of another set in the list? Use a Venn
diagram to illustrate each relationship.
C. If X = { a, b, c, d, e, f, g };
1. write two subsets of A that satisfy the given condition:
a. Contain one element c. Contain three elements
b. Contain two elements d. Contain four elements
2. How many one element subsets can be formed?
3. How many two elements subsets can be formed?
1. Write all the subsets of
a. A = { a } b. B = { a, b }
2. We saw that C = { a, b, c } has 8 subsets.
Investigate the number of subsets of a set of n elements. Line
up the subsets A, B and C, one line below another, with the same
subsets below each other. Study how the subsets of a set of two
elements can be obtained from those of a set of one element; how
the subsets of a set of three elements can be obtained from those of
a set with two elements.
Answer:
wala pong masasagotan dyan -_-
1. { 1, 2 } { 1, 2, 3 } 5. { n, e, t} { t, e, a, n }
2. 0 is a subset of { 0 } 6. 5 { n | n is a factor of 20 }
3. {1, 2, 3 } { 1, 2, 4} 7. 11 { n | n is a whole number }
4. { a, u } {a, e, i, o, u} 8. 7 { n | n is an odd number g
Justify your answers.
A = { 1, 2, 4, 6, 12 } E = { x | x is an even number }
V = {a, i, e, o, u } O = { y | y is an odd number }
B = { n | n is a factor of 12} D = {odd numbers less than 10}
C = { 1, 3, 5, 7, 9 } G = { z | z is a vowel }
N = { n| n is a whole number}
1. Which sets are equal?
2. Which sets are equivalent?
3. Which set(s) is/are subsets of another set in the list? Use a Venn
diagram to illustrate each relationship.
1. write two subsets of A that satisfy the given condition:
a. Contain one element c. Contain three elements
b. Contain two elements d. Contain four elements
2. How many one element subsets can be formed?
3. How many two elements subsets can be formed?
1. Write all the subsets of
a. A = { a } b. B = { a, b }
2. We saw that C = { a, b, c } has 8 subsets.
Investigate the number of subsets of a set of n elements. Line
up the subsets A, B and C, one line below another, with the same
subsets below each other. Study how the subsets of a set of two
elements can be obtained from those of a set of one element; how
the subsets of a set of three elements can be obtained from those of
a set with two elements.