Factorise : 81 - ( x - 7 )².
Answers
9^2-(x-7)^2
(9+x-7)(9-x+7)
(x+2)(16-x)
Answer:
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))81 (x-7)² = (2+x)(9− x + 7) -
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))81 (x-7)² = (2+x)(9− x + 7) -81 (x-7)² = (2+x)(16x)
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))81 (x-7)² = (2+x)(9− x + 7) -81 (x-7)² = (2+x)(16x)The factorize form of the term is 81 - (x-7)² = (2+x)(16x)
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))81 (x-7)² = (2+x)(9− x + 7) -81 (x-7)² = (2+x)(16x)The factorize form of the term is 81 - (x-7)² = (2+x)(16x)Step-by-step explanation:
Answer:The factorize form of the term is 81 - (x-7)² = (2+x)(16 — x)Step-by-step explanation:Given : Expression 81 - (x - 7)²To find : Factorize the term ?Solution :Expression 81 - (x − 7)²Re-write 81 as 81 = 9²81 (x-7)² = 9² — (x-7) ²Apply identity, a² − b² = (a + b)(a - b)81 - (x −7)² = (9 + x − 7) (9 — (x − 7))81 (x-7)² = (2+x)(9− x + 7) -81 (x-7)² = (2+x)(16x)The factorize form of the term is 81 - (x-7)² = (2+x)(16x)Step-by-step explanation:if you like my answer please mark me as brainliest answer