Question
Read the following conditional statement: If Siddharth does his homework, then he gets his weekly allowance.
What is the hypothesis?
- Siddharth does his homework.
- Siddharth gets his weekly allowance.
Hint:
A statement is consisting of two parts one is hypothesis and other one conclusion. The assumption drawn from the given statement is called Hypothesis whereas conclusion is the result which we draw using the given statements. Here, we have to find the hypothesis in the given statements.
The correct answer is: Siddharth does his homework.
In the question the given statement is " If Siddharth does his homework, then he gets his weekly allowance.".
Here, we have have to determine the hypothesis in the given statement.
Let us consider the statement to be in the form of “if A, then B” where, A= Siddharth does his homework and B= he gets his weekly allowance.
Then, A will be the hypothesis and B will be the conclusion.
So, the hypothesis in the given statement is Siddharth does his homework.
Therefore, the correct option is a, i.e., Siddharth does his homework.
If the statement is in the form “if A, then B” then here A is the hypothesis and B is the conclusion.
Related Questions to study
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the contrapositive of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the contrapositive of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the inverse of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the inverse of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the converse of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Read the following conditional statement: If it is raining, then Kangana has her umbrella up.
Write the converse of the statement.
If the statement is in the form “if A, then B” here the converse of the statement will be “if B, then A” whereas in inverse the statement will be “if not A, then not B” and in contrapositive the statement will be “if not B, then not A”.
Look at the pattern 2, 4, 6, 8, 10, ...
What is the 19th term in the pattern?
We observed that there is a difference of two in each case and then found the no corresponding to 19th position = 38
Look at the pattern 2, 4, 6, 8, 10, ...
What is the 19th term in the pattern?
We observed that there is a difference of two in each case and then found the no corresponding to 19th position = 38
A dot pattern is shown below. What would the total number of dots be in the 6th figure?
![](data:image/png;base64,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)
In the solution first we observed all the images and then based on the feedback we got we found no of dots in 6th image = 21 dots
A dot pattern is shown below. What would the total number of dots be in the 6th figure?
![](data:image/png;base64,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)
In the solution first we observed all the images and then based on the feedback we got we found no of dots in 6th image = 21 dots
Find a pattern for the sequence. Use the pattern to find the next three terms in the sequence.
2, 4, 7, 11,...
In this question first we found how the pattern is there and we observed it is based on the difference so we found difference in each case and obtained the continuing terms of the series.
Find a pattern for the sequence. Use the pattern to find the next three terms in the sequence.
2, 4, 7, 11,...
In this question first we found how the pattern is there and we observed it is based on the difference so we found difference in each case and obtained the continuing terms of the series.
Which box is next in the sequence?
![](data:image/png;base64,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)
Which box is next in the sequence?
![](data:image/png;base64,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)
Which box is next in the sequence?
![](data:image/png;base64,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)
Which box is next in the sequence?
![](data:image/png;base64,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)
Which box is next in the sequence?
![](data:image/png;base64,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)
Which box is next in the sequence?
![](data:image/png;base64,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)
If STUV is a parallelogram, then the value of y must be ___________.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
If STUV is a parallelogram, then the value of y must be ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The length of side XY is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The length of side XY is ______.
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The given polygon is called a ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The given polygon is called a ___________.
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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
The sum of interior angles of an octagon is __________.
Octagon is an eight sided polygon whose sum of all angles can be determined using the formula: , where n is the number of sides of the polygon.
The sum of interior angles of an octagon is __________.
Octagon is an eight sided polygon whose sum of all angles can be determined using the formula: , where n is the number of sides of the polygon.
For what values of is ABCD a parallelogram?
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
For what values of is ABCD a parallelogram?
![](data:image/png;base64,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)
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.
Parallelogram is a four-sided polygon whose opposite sides are parallel and equal to each other and the opposite angles are equal to each other. The sum of all angles of a parallelogram is and sum of two consecutive angles is
. The diagonals of a parallelogram bisect each other and the angle into two equal halves. Here, we have to use these properties of a parallelogram and solve the given question.