Near a convergent plate boundary, you can typically find the following land features:
1. Mountains and Mountain Ranges: Convergent plate boundaries often result in the collision of two continental plates or a continental plate with an oceanic plate. This collision leads to the formation of folded and uplifted mountains and mountain ranges. Examples include the Himalayas, Andes, and Alps.
2. Volcanoes: Convergent boundaries involving an oceanic plate and a continental plate or two oceanic plates often result in subduction, where one plate is forced beneath the other. This subduction can lead to the formation of volcanic arcs, where volcanoes are formed. Examples include the Ring of Fire in the Pacific Ocean and the Cascade Range in the United States.
3. Trenches: Subduction zones at convergent boundaries can also result in the formation of deep oceanic trenches. These trenches are the deepest parts of the ocean and are formed when one oceanic plate is forced beneath another. Examples include the Mariana Trench in the western Pacific Ocean and the Peru-Chile Trench in the southeastern Pacific Ocean.
4. Fault Lines: Convergent plate boundaries can also have associated fault lines. These faults can result in earthquakes as the plates interact with each other. Examples include the San Andreas Fault in California and the Alpine Fault in New Zealand.
5. Island Arcs: In cases where two oceanic plates converge, an island arc can form. These are chains of volcanic islands that are formed as a result of the subduction of one oceanic plate beneath another. An example is the Aleutian Islands in Alaska.
These are some of the main land features that can be found near a convergent plate boundary. The specific features will depend on the type of plates involved (continental or oceanic) and the tectonic forces at work in that particular region.
Which land features are typically found near a convergent plate boundary?
21 answers
Write the following phrase as an expression: y less than 15(1 point) Responses y - 15 y - 15 15 - y 15 - y + 15 y + 15 15 + y
y < 15
Are the following expressions equivalent? 8(4x+2) and 32+16 (1 point) Responses Yes Yes No
Yes
Identify the parts of the following expression: 5x2+4x+15 (1 point) What is the constant: What is the variable: What is the exponent: What is the coefficient of the second term: Skip to navigation
In the expression 5x^2 + 4x + 15:
- The constant is 15. It is a term without any variable.
- The variable is x. It represents an unknown quantity that can take various values.
- The exponent is 2. It is the superscript that indicates that the variable x is raised to the power of 2.
- The coefficient of the second term, which is 4x, is 4. It is the number multiplied by the variable.
- The constant is 15. It is a term without any variable.
- The variable is x. It represents an unknown quantity that can take various values.
- The exponent is 2. It is the superscript that indicates that the variable x is raised to the power of 2.
- The coefficient of the second term, which is 4x, is 4. It is the number multiplied by the variable.
Write the following phrase as an expression: the product of 2 and x(1 point) Responses 2÷x 2÷x 2+x 2 plus x 2−x 2 minus x 2x
The expression for "the product of 2 and x" would be: 2x
You are purchasing furniture and the salesperson offers you a $25 discount if you purchase 4 or more chairs at $30 each. Write an expression to determine how much the chairs would cost in total if you receive the discount.(1 point) Responses 30c - 25 30c - 25 30c + 25 30c + 25 25c - 30 25c - 30 25c + 30 25c + 30
The expression to determine how much the chairs would cost in total if you receive the $25 discount is: 30c - 25
Where:
c represents the number of chairs you purchase.
Where:
c represents the number of chairs you purchase.
What is the solution to the following problem? 14−2+6×32 (1 point) Responses 162 162 48 48 26 26 66 66
To solve the problem 14 - 2 + 6 × 32, we need to follow the order of operations, which states that multiplication and division should be done before addition and subtraction.
First, we perform the multiplication: 6 × 32 = 192.
Then, we perform the addition and subtraction from left to right: 14 - 2 + 192 = 12 + 192 = 204.
Therefore, the solution to the problem is 204.
First, we perform the multiplication: 6 × 32 = 192.
Then, we perform the addition and subtraction from left to right: 14 - 2 + 192 = 12 + 192 = 204.
Therefore, the solution to the problem is 204.
Combine like terms: 5x2+7y+9x+3x2−2x−y (1 point) Responses 8x2+11x +7y 8x2+11x +7y 8x2+7x+6y 8 x squared plus 7 x plus 6 y 15x2+6y 15 x squared plus 6 y 21x2xy
To combine like terms in the expression 5x^2 + 7y + 9x + 3x^2 - 2x - y, we add the coefficients of terms with the same variables raised to the same powers:
5x^2 + 3x^2 = 8x^2
7y - y = 6y
9x - 2x - x = 6x
Therefore, the combined expression is 8x^2 + 6x + 6y.
5x^2 + 3x^2 = 8x^2
7y - y = 6y
9x - 2x - x = 6x
Therefore, the combined expression is 8x^2 + 6x + 6y.
A person living in an apartment puts down a $300 deposit when they move in and then pays $700 of rent each month. Write an expression to represent the housing cost for this situation at the end of m months. (1 point) Responses 300m + 700 300 m + 700 300m - 700 300 m - 700 700m + 300 700 m + 300 700m - 300 700 m - 300
The expression to represent the housing cost for this situation at the end of m months is: 300m + 700
Where:
m represents the number of months.
Where:
m represents the number of months.
Which expression is equivalent to 7+5y3−3+8k+y3+12k (1 point) Responses 6y3+20k+4 6 y cubed plus 20 k plus 4 12y3+5k+13y3k 12 y cubed plus 5 k plus 13 y cubed k 36y3k 36 y cubed k 33y3k
To simplify the expression 7 + 5y^3 - 3 + 8k + y^3 + 12k, we need to combine like terms:
Combining the constant terms, 7 and -3, we get -3 + 7 = 4.
Combining the like terms with y^3, 5y^3 and y^3, we get 5y^3 + y^3 = 6y^3.
Combining the like terms with k, 8k and 12k, we get 8k + 12k = 20k.
Therefore, the equivalent expression is: 6y^3 + 20k + 4.
Combining the constant terms, 7 and -3, we get -3 + 7 = 4.
Combining the like terms with y^3, 5y^3 and y^3, we get 5y^3 + y^3 = 6y^3.
Combining the like terms with k, 8k and 12k, we get 8k + 12k = 20k.
Therefore, the equivalent expression is: 6y^3 + 20k + 4.
Add and Subtract Fractions to Solve Problems Quick Check 5 of 55 of 5 Items Question Your neighborhood would like to raise funds to update the equipment in the neighborhood park. They hold a bake sale and raise 38 of the desired funds and then have a neighborhood yard sale and raise another 14 . What is the total fractional amount of the desired funds they have raised?(1 point) Responses 18 Start Fraction 1 over 8 End Fraction 58 Start Fraction 5 over 8 End Fraction 12 Start Fraction 1 over 2 End Fraction 13 Start Fraction 1 over 3 End Fraction
To find the total fractional amount of the desired funds raised, we need to add the fractions 3/8 and 1/4:
3/8 + 1/4
To add these fractions, we need to find a common denominator. In this case, the least common multiple of 8 and 4 is 8.
Converting 1/4 to have a denominator of 8, we get 2/8.
Now, we can add the fractions:
3/8 + 2/8 = 5/8
Therefore, the total fractional amount of the desired funds they have raised is 5/8.
3/8 + 1/4
To add these fractions, we need to find a common denominator. In this case, the least common multiple of 8 and 4 is 8.
Converting 1/4 to have a denominator of 8, we get 2/8.
Now, we can add the fractions:
3/8 + 2/8 = 5/8
Therefore, the total fractional amount of the desired funds they have raised is 5/8.
5 answers