Given, ∣x∣2−7∣x∣+9≤0
⇒∣x∣≤27±13
⇒∣x∣∈[27−13,27+13]
Also given x∈Integers, so x can be ±2,±3,±4,±5
Now out of these values of x only 3,−4,−5 will satisfy S=∣x∣−2∣x+3∣−1≥0
So, S∩T∈3,−4,−5
So, n(S∩T)=3
Let S=x∈[−6,3]−−2,2:∣x∣−2∣x+3∣−1≥0 and T=x∈Z:x2−7∣x∣+9≤0. Then the number of elements in S∩T is
Held on 28 Jul 2022 · Verified 6 Jul 2026.
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