Math, asked by poornima9236, 15 hours ago

97. The degree of the expression (3p2+2q2) - (5q+6p2) + (7p2-9p) is: ​

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Answered by santoshgupta9495
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We know that the degree is the term with the greatest exponent and,

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.pq has degree 2 (p has an exponent of 1, q also has 1, and 1+1=2)

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.pq has degree 2 (p has an exponent of 1, q also has 1, and 1+1=2)p2q has degree 3 (p has an exponent of 2, q has 1, and 2+1=3)

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.pq has degree 2 (p has an exponent of 1, q also has 1, and 1+1=2)p2q has degree 3 (p has an exponent of 2, q has 1, and 2+1=3)p2q2 has degree 4 (p has an exponent of 2, q also has 2, and 2+2=4)

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.pq has degree 2 (p has an exponent of 1, q also has 1, and 1+1=2)p2q has degree 3 (p has an exponent of 2, q has 1, and 2+1=3)p2q2 has degree 4 (p has an exponent of 2, q also has 2, and 2+2=4)Since the highest degree amongst all the terms is 4, therefore, the degree of pq+p2q−p2q2 is 4.

We know that the degree is the term with the greatest exponent and,To find the degree of a monomial with more than one variable for the same term, just add the exponents for each variable to get the degree.The given algebraic expression pq+p2q−p2q2 has three terms. The first one is pq, the second is p2q and the third one is −p2q2.pq has degree 2 (p has an exponent of 1, q also has 1, and 1+1=2)p2q has degree 3 (p has an exponent of 2, q has 1, and 2+1=3)p2q2 has degree 4 (p has an exponent of 2, q also has 2, and 2+2=4)Since the highest degree amongst all the terms is 4, therefore, the degree of pq+p2q−p2q2 is 4.Hence, the degree of the algebraic expression pq+p2q−p2q2 is 4.

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