If * is defined by a*b = a - b2 and ⊕ is defined by ⊕ = a2 + b, where a and b are integers, then (3 ⊕ 4) * 5 is equal to

Question

If * is defined by a*b = a - b2 and ⊕ is defined by ⊕ = a2 + b, where a and b are integers, then (3 ⊕ 4) * 5 is equal to (A) 164 (B) 38 (C) -12 (D) -28

Tardigrade Admin · Accepted Answer

Given, a*b =a-b2 dots(i) and a ⊕ b=a2+b dots(ii) where, a and b are integers. Then, (3 ⊕ 4)* 5 = (3)2+4 * 5 =(9+4)* 5=13* 5 =13-(5)2=13-25=-12

Q. If $$ is defined by $a b$ = $a - b^{2}$ and $\oplus$ is defined by $\oplus$ = $a^{2} + b$ , where a and b are integers, then ( $3 \oplus 4) * 5$ is equal to

164

38

-12

-28

144

Given, $a^{} b = a - b^{2} \dots (i)$
and $a \oplus b = a^{2} + b \dots (ii)$
where, $a$ and $b$ are integers.
Then, $(3 \oplus 4)^{} 5 = {(3)^{2} + 4}^{} 5$
$= (9 + 4)^{} 5 = 1 3^{*} 5$
$= 13 - (5)^{2} = 13 - 25 = - 12$

Q. If ∗ is defined by a∗b = a−b2 and ⊕ is defined by ⊕ = a2+b, where a and b are integers, then (3⊕4)∗5 is equal to

164

38

-12

-28

144

Given, a∗b=a−b2…(i) and a⊕b=a2+b…(ii) where, a and b are integers. Then, (3⊕4)∗5={(3)2+4}∗5 =(9+4)∗5=13∗5 =13−(5)2=13−25=−12

Q. If $$ is defined by $a b$ = $a - b^{2}$ and $\oplus$ is defined by $\oplus$ = $a^{2} + b$ , where a and b are integers, then ( $3 \oplus 4) * 5$ is equal to

Given, $a^{} b = a - b^{2} \dots (i)$
and $a \oplus b = a^{2} + b \dots (ii)$
where, $a$ and $b$ are integers.
Then, $(3 \oplus 4)^{} 5 = {(3)^{2} + 4}^{} 5$
$= (9 + 4)^{} 5 = 1 3^{*} 5$
$= 13 - (5)^{2} = 13 - 25 = - 12$